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Physics of radio emission in gamma-ray pulsars

Published online by Cambridge University Press:  18 April 2016

S. A. Petrova*
Affiliation:
Institute of Radio Astronomy, NAS of Ukraine, Chervonopraporna Str., 4, Kharkov 61002, Ukraine
*
Email address for correspondence: petrova@rian.kharkov.ua
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Abstract

Propagation of radio emission in a pulsar magnetosphere is reviewed. The effects of polarization transfer, induced scattering and reprocessing to high energies are analysed with a special emphasis on the implications for the gamma-ray pulsars. The possibilities of the pulsar plasma diagnostics based on the observed radio pulse characteristics are also outlined. As an example, the plasma number density profiles obtained from the polarization data for the Vela and the gamma-ray millisecond pulsars J1446-4701, J1939+2134 and J1744-1134 are presented. The number densities derived tend to be the highest/lowest when the radio pulse leads/lags the gamma-ray peak. In the PSR J1939+2134, the plasma density profiles for the main pulse and interpulse appear to fit exactly the same curve, testifying to the origin of both radio components above the same magnetic pole and their propagation through the same plasma flow in opposite directions. The millisecond radio pulse components exhibiting flat position angle curves are suggested to result from the induced scattering of the main pulse by the same particles that generate gamma rays. This is believed to underlie the wide-sense radio/gamma-ray correlation in the millisecond pulsars. The radio quietness of young gamma-ray pulsars is attributed to resonant absorption, whereas the radio loudness to the radio beam escape through the periphery of the open field line tube.

Type
Research Article
Copyright
© Cambridge University Press 2016 

1 Introduction

Pulsar radio emission is generally associated with the processes in the secondary electron–positron plasma produced in the polar gap and outflowing along the open magnetic field lines (for a review of pulsar radio emission mechanisms see, e.g. Lyubarsky Reference Lyubarsky1995; Melrose Reference Melrose2003; Lyubarsky Reference Lyubarsky2008). As the radio emission originates deep in the open field line tube, it should propagate through the plasma flow. The propagation effects should substantially modify the radio pulse characteristics and prove to have pronounced observational manifestations. Furthermore, the propagation concept has a great potential for diagnostics of the pulsar plasma.

For the first 40 years of pulsar research, the picture of a pulsar was chiefly based on the comprehensive observational radio emission data. The numerous gamma-ray pulsar detections by Fermi LAT (Abdo et al. Reference Abdo, Ackermann, Ajello, Atwood, Axelsson, Baldini, Ballet, Barbiellini, Baring and Bastieri2010, Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013) have convincingly demonstrated the incompleteness of the classical picture of a pulsar. As the gamma-ray emission with the observed spectral characteristics cannot originate in the polar gap (Abdo et al. Reference Abdo, Ackermann, Ajello, Atwood, Axelsson, Baldini, Ballet, Barbiellini, Baring and Bastieri2010), the actual pulsar model needs to include the regions of particle acceleration and very high-energy emission in the outer magnetosphere or beyond the light cylinder. Moreover, the gamma-ray observations, in conjunction with the already known or follow-up radio data, have revealed the principal new features of the pulsar radio emission (Abdo et al. Reference Abdo, Ackermann, Ajello, Atwood, Axelsson, Baldini, Ballet, Barbiellini, Baring and Bastieri2010, Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013). In particular, the class of young, energetic radio quiet pulsars has been established. As for the young radio loud pulsars, their radio pulses typically precede in phase the high-energy profiles. In contrast, in the gamma-ray millisecond pulsars (all of which are radio loud), the radio pulse components can be located differently with respect to the gamma-ray profile: they can either lead or lag the main gamma-ray peak, or roughly coincide with it.

These results are traditionally interpreted on geometrical grounds. As the radio beam originates deep in the open field line tube, it is much narrower than the high-energy emission pattern and, correspondingly, can much more frequently miss an unfavourably located observer, making the phenomenon of a radio quiet gamma-ray pulsar quite common. The gamma-ray light curves, including their location relative to the radio profile, are modelled extensively with a number of assumptions as to the gamma-ray emission region. The gamma rays are associated with the outer, slot and partially screened polar gap (Johnson et al. Reference Johnson, Venter, Harding, Guillemot, Smith, Kramer, Çelik, den Hartog, Ferrara and Hou2014; Pierbattista et al. Reference Pierbattista, Harding, Grenier, Johnson, Caraveo, Kerr and Gonthier2015), with the acceleration region of the finite-conductivity plasma beyond the light cylinder of the force-free magnetosphere (Kalapotharakos, Harding & Kazanas Reference Kalapotharakos, Harding and Kazanas2014; Brambilla et al. Reference Brambilla, Kalapotharakos, Harding and Kazanas2015), and with the magnetospheric current sheet (Uzdensky & Spitkovsky Reference Uzdensky and Spitkovsky2014; Cerutti, Philippov & Spitkovsky Reference Cerutti, Philippov and Spitkovsky2016). Each of the models fits the observational data satisfactorily, and at the moment neither of them can be ruled out.

As a rule, the gamma-ray pulsar studies exploit the radio pulse data only in the geometrical aspect. It should be noted, however, that the pulsar radio emission bears a wealth of valuable information. In the present paper, we concentrate on the physics of pulsar radio emission, placing particular emphasis on the case of gamma-ray pulsars. Section 2 contains the basics of the radio wave propagation theory. We outline the observational consequences of the propagation effects and demonstrate their potential to probe the pulsar plasma. Section 3 is devoted to interpretation of the radio peculiarities of the gamma-ray pulsars in terms of the propagation effects. It is shown that the radio quietness of young pulsars can be attributed to significant synchrotron absorption. The radio pulse components of millisecond pulsars, which lag the main high-energy peak, or roughly coincide with it, are suggested to result from induced scattering of the pulsar radio beam in the outer magnetosphere. In § 4, the problems and prospects are discussed.

2 Propagation effects in pulsar plasma

2.1 Polarization transfer

The ultrarelativistic highly magnetized plasma of pulsars allows two non-damping natural waves, the ordinary and extraordinary ones (e.g Melrose & Stoneham Reference Melrose and Stoneham1977; Arons & Barnard Reference Arons and Barnard1986; Lyutikov Reference Lyutikov1998a ; Melrose et al. Reference Melrose, Gedalin, Kennett and Fletcher1999). In case of negligible gyrotropy, the two types of waves are polarized linearly, with the electric vector lying in the plane of the ambient magnetic field and perpendicular to this plane, respectively. The two-stream instability, which is most probably responsible for the pulsar radio emission in the inner magnetosphere (Ichimaru Reference Ichimaru1970; Sturrock Reference Sturrock1970; Ursov & Usov Reference Ursov and Usov1988; Asseo, Pelletier & Sol Reference Asseo, Pelletier and Sol1990; Weatherall Reference Weatherall1994; Asseo & Melikidze Reference Asseo and Melikidze1998; Lyubarskii & Petrova Reference Lyubarskii and Petrova2000), cannot generate the extraordinary waves directly, because of their vacuum dispersion (e.g. Lyubarsky Reference Lyubarsky1995). The non-damping ordinary waves are superluminal and can arise as a result of induced scattering of the subluminal ones off the plasma particles in the radio emission region (Lyubarskii Reference Lyubarskii1996).

In a number of pulsars, the radio emission is indeed characterized by a high percentage of linear polarization, with the position angle swing across the pulse reflecting the change of the ambient magnetic field projection onto the plane of the sky as the pulsar rotates (Radhakrishnan & Cooke Reference Radhakrishnan and Cooke1969). In general, however, the empirical picture of radio pulsar polarization appears much more complicated. As a rule, pulsar radio emission is a mixture of the two polarized modes, which generally have elliptical polarization and can be markedly non-orthogonal. The ellipticities and position angles of the modes, as well as their intensity ratio, fluctuate strongly from pulse to pulse.

The observed polarization peculiarities can be attributed to polarization transfer of radio waves in the pulsar magnetosphere. Moreover, the propagation origin of the radio pulse polarization implies a unique possibility to probe the pulsar plasma based on the observed polarization profiles.

In the vicinity of the emission region, the characteristic scale length for beating between the natural modes, $L_{b}\sim c/({\it\omega}{\rm\Delta}n)$ (where ${\it\omega}$ is the wave frequency, ${\rm\Delta}n$ the difference of the mode refractive indices, $c$ the speed of light), is much less than the scale length for change in the plasma characteristics, $L_{p}\sim r$ (where $r$ is the altitude above the neutron star). Therefore, the geometrical optics approximation is valid, in which case the electric vector of the modes follows the local orientation of the ambient magnetic field (Cheng & Ruderman Reference Cheng and Ruderman1979; Barnard Reference Barnard1986). Pronounced polarization evolution can be expected in the regions where ${\rm\Delta}n\rightarrow 0$ and the regime of geometrical optics is broken.

2.1.1 Linear conversion

The refractive indices of the natural waves become almost equal in the region of quasi-longitudinal propagation with respect to the ambient magnetic field. In general, ray propagation in the open field line tube is quasi-transverse, ${\it\theta}\gg 1/{\it\gamma}$ (where ${\it\theta}$ is the wave vector tilt to the magnetic field, ${\it\gamma}$ the plasma Lorentz factor). However, due to refraction of radio waves in the pulsar plasma, in the inner magnetosphere the ray trajectory may contain a short segment almost parallel to the magnetic field. It is the place where the natural waves suffer linear conversion (Petrova Reference Petrova2001). The original ordinary waves become an incoherent mixture of the ordinary and extraordinary ones, which further on propagate independently. The total intensity is conserved, and the mode intensity ratio is determined by the characteristics of the plasma in the region of conversion. The anticorrelation of polarization mode intensities found in PSR B0329+54 (Edwards Reference Edwards2004) strongly suggests that it is the linear conversion that underlies the phenomenon of orthogonally polarized modes in pulsar emission. Being interpreted in terms of linear conversion, the mode intensities and their longitudinal and pulse-to-pulse fluctuations can be regarded as a probe of the pulsar plasma distribution and its temporal variations.

2.1.2 Polarization-limiting effect

As the open field line tube widens with distance from the neutron star, the plasma number density decreases and the refractive index of the ordinary waves tends to unity. Correspondingly, in the outer magnetosphere, the geometrical optics approximation is again broken and the waves are subject to the polarization-limiting effect (Cheng & Ruderman Reference Cheng and Ruderman1979; Barnard Reference Barnard1986; Lyubarskii & Petrova Reference Lyubarskii and Petrova1998a ; Petrova & Lyubarskii Reference Petrova and Lyubarskii2000). In the polarization-limiting region, the electric vector of the waves has no time to follow the ambient magnetic field direction and wave mode coupling starts. As a result, each of the incident natural waves becomes a coherent mixture of the two natural modes of the ambient plasma, acquiring some circular polarization and position angle shift. As the two types of waves evolve identically, the outgoing radiation presents a superposition of the two purely orthogonal elliptically polarized modes. This is in line with the empirical model of pulsar polarization (e.g. McKinnon & Stinebring Reference McKinnon and Stinebring2000).

2.1.3 Diagnostics of pulsar plasma

The ellipticity and position angle shift resulting from the wave mode coupling are related to each other, both being determined by the plasma characteristics in the polarization-limiting region. Based on this relation, a technique of number density diagnostics of a pulsar plasma was developed (Petrova Reference Petrova2003a ). It allows us to obtain the plasma number density distribution in the open field line tube proceeding from the observed polarization radio profile of a pulsar.

At a fixed altitude $r_{0}$ in the tube, the number density $N_{0}$ changes as function of the polar angle ${\it\chi}$ . Besides that, because of continuity, the plasma flow widens with altitude together with the open field line tube in such a way that

(2.1) $$\begin{eqnarray}N\left(r,\frac{{\it\chi}}{{\it\chi}_{f}(r)}\right)=N_{0}\left(\frac{{\it\chi}}{{\it\chi}_{f}(r_{0})}\right)\left(\frac{r}{r_{0}}\right)^{-3},\end{eqnarray}$$

where $N$ is the number density at the altitude $r$ and ${\it\chi}_{f}$ is the polar angle of the tube boundary at the corresponding altitude. Furthermore, it is convenient to normalize $N$ to the Goldreich–Julian number density (Goldreich & Julian Reference Goldreich and Julian1969),

(2.2) $$\begin{eqnarray}{\it\kappa}=\frac{NPce}{B},\end{eqnarray}$$

where $B$ is the magnetic field strength at the same altitude $r$ , $P$ the pulsar period, $c$ the speed of light and $e$ the electron charge. The resultant multiplicity ${\it\kappa}$ is independent of altitude and generally characterizes the number of secondary particles per primary particle (the theories of the polar gap pair creation cascade yield the multiplicity values in the range from less than unity up to ${\sim}10^{5}$ (Hibschman & Arons Reference Hibschman and Arons2001b ; Arendt & Eilek Reference Arendt and Eilek2002; Medin & Lai Reference Medin and Lai2010; Timokhin & Harding Reference Timokhin and Harding2015); in the outer gap scenario, the multiplicities may also be as high as ${\sim}10^{4}{-}10^{5}$ (e.g. Takata, Wang & Cheng Reference Takata, Wang and Cheng2010); in the wind zone, even higher values, ${\sim}10^{6}{-}10^{8}$ , are expected (e.g. Tanaka & Takahara Reference Tanaka and Takahara2013)). Thus, the plasma number density profile presented in terms of ${\it\kappa}({\it\chi}/{\it\chi}_{f})$ is a universal characteristic of the plasma distribution inside the open field line tube of a pulsar. It should be noted that since the radio beam coming into the polarization-limiting region usually occupies a small part of the tube cross-section, only a part of the plasma density distribution can be reconstructed from the observed polarization profile. Making use of the multifrequency polarization data allows to extend the region available for the plasma diagnostics substantially.

Figure 1 illustrates the relevant geometry. Figure 2 exhibits examples of application of the technique to the average polarization radio profiles of several gamma-ray pulsars. The resultant plasma density profiles show an exponential decrease towards the edge of the open field line tube, with the exponent being well fitted by a second-order polynomial. (Such a character of the plasma density distribution is similar to that found for the longer-period pulsars PSR B0355+54 and PSR B0628-28 in Petrova (Reference Petrova2003a ).)

Figure 1. Pulsar geometry; the magnetic moment and the line of sight are inclined to the rotation axis at the angles ${\it\alpha}$ and ${\it\zeta}$ , respectively, ${\it\beta}\equiv {\it\zeta}-{\it\alpha}$ is the impact angle and ${\it\psi}$ the geometrically defined position angle.

Figure 2. Plasma density profiles for the Vela (a) and the millisecond gamma-ray pulsars J1446-4701, J1744-1134 and J1939+2134 (b); ${\it\kappa}$ is the plasma multiplicity defined as the number density normalized to the Goldreich–Julian number density, ${\it\chi}$ the polar angle of a point inside the open field line tube, ${\it\chi}_{f}$ the polar angle of the tube boundary at the corresponding altitude. The circles, squares and triangles in the upper panel mark the points obtained from the polarization data of Johnston, Karastergiou & Willett (Reference Johnston, Karastergiou and Willett2006), Karastergiou & Johnston (Reference Karastergiou and Johnston2006) at 1.4, 3.1 and 8.4 GHz, respectively. The points in the lower panel are obtained from the polarization profiles of Dai et al. (Reference Dai, Hobbs, Manchester, Kerr, Shannon, van Straten, Mata, Bailes, Bhat and Burke-Spolaor2015) at 1.4 GHz; the squares and circles correspond to the main pulse and interpulse data, respectively. The polarization profiles are available via the EPN Database of Pulsar Profiles at http://www.epta.eu.org/epndb. The geometry assumed is as follows: ${\it\alpha}=35.6^{\circ }$ , ${\it\beta}=4^{\circ }$ for the Vela, ${\it\alpha}=60^{\circ }$ , ${\it\beta}=5^{\circ }$ for J1446-4701, ${\it\alpha}=40^{\circ }$ , ${\it\beta}=1.5^{\circ }$ for J1744-1134 and ${\it\alpha}=79^{\circ }$ , ${\it\beta}=4^{\circ }$ for J1939+2134, where ${\it\alpha}$ is the pulsar inclination and ${\it\beta}$ the impact angle.

The class of young energetic gamma-ray pulsars is presented by the Vela pulsar (see figure 2 a). As can be seen, the points resulting from the polarization data at different frequencies well match the same curve, confirming the validity of the technique used. The plasma multiplicity values appear in line with the results of numerical simulations of pair cascades in the polar gap (Hibschman & Arons Reference Hibschman and Arons2001b ; Arendt & Eilek Reference Arendt and Eilek2002; Medin & Lai Reference Medin and Lai2010), though they depend appreciably on the pulsar geometry assumed.

Figure 2(b) shows the plasma density profiles for three gamma-ray millisecond pulsars, PSRs J1446-4701, J1939+2134 and J1744-1134, which are the representatives of the three classes, with the radio pulse components leading, coincident with and lagging the main gamma-ray peak (cf. Abdo et al. Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013). As is evident from the figure, the plasma multiplicities for the three pulsars differ substantially, being the highest for the leading and the lowest for the trailing position of the radio pulse. In the former case, the plasma multiplicities are more or less similar to those of the Vela pulsar, where the radio profile also leads the high-energy peak. The latter is in general agreement with an interpretation in terms of a partially screened gap (e.g. Johnson et al. Reference Johnson, Venter, Harding, Guillemot, Smith, Kramer, Çelik, den Hartog, Ferrara and Hou2014), in which case the open field line tube is deficient of pair plasma.

Our result, however, should be taken with caution, since the scaling of the plasma density profiles along both axes noticeably depends upon the poorly known pulsar geometry. To the best of our knowledge, the only constraints on the geometrical parameters of the pulsars considered are obtained from gamma-ray light-curve modelling (e.g. Johnson et al. Reference Johnson, Venter, Harding, Guillemot, Smith, Kramer, Çelik, den Hartog, Ferrara and Hou2014). Keeping in mind these results, we have taken the values which provide ${\it\chi}/{\it\chi}_{f}\leqslant 1$ for the points of the plasma density profile. In fact, the values ${\it\chi}/{\it\chi}_{f}>1$ may be quite realistic, since for the millisecond pulsars the assumption of a purely dipolar magnetic field structure involved in our technique can hardly be regarded as appropriate. Note that the plasma density profiles appear to lie within ${\it\chi}/{\it\chi}_{f}\leqslant 1$ for quite special geometries, whereas over a broad range of geometrical parameters ${\it\chi}/{\it\chi}_{f}$ may be a few times larger, in which case the multiplicities are typically much higher as well.

The only advantage of our choice of the pulsar geometry and of our approach on the whole is definiteness. At present, the force-free model (e.g. Spitkovsky Reference Spitkovsky2006; Philippov, Spitkovsky & Cerutti Reference Philippov, Spitkovsky and Cerutti2015), its dissipative versions (e.g. Kalapotharakos et al. Reference Kalapotharakos, Kazanas, Harding and Contopoulos2012; Li, Spitkovsky & Tchekhovskoy Reference Li, Spitkovsky and Tchekhovskoy2012) and MHD extension (e.g. Tchekhovskoy, Spitkovsky & Li Reference Tchekhovskoy, Spitkovsky and Li2013) provide a more realistic representation of the pulsar magnetosphere. These models, being much more advanced as compared to the classical vacuum dipole model, contain a number of additional ingredients, such as the global electric current, the accelerating electric field, etc. One can expect that incorporating all this into the theory of polarization transfer would complicate it substantially, and the transparent unambiguous relation between the observed quantities, which underlies the above discussed technique of the plasma diagnostics would no longer be the case. It is yet to be understood what the main features are of the polarization evolution of radio waves in the force-free magnetosphere, and what it may imply for the plasma diagnostics. It should also be kept in mind that, since the particle motion in the force-free fields is principally distinct from the motion of a probe particle in fixed fields of the same strength, the polarization transfer in the force-free magnetosphere should be considered anew, e.g. based on the self-consistent two-fluid model (Beskin & Rafikov Reference Beskin and Rafikov2000; Kojima & Oogi Reference Kojima and Oogi2009; Petrova Reference Petrova2015).

One more important point can be noticed in figure 2(b). For the pulsar PSR J1939+2134, the points of the plasma density profile obtained from the main pulse and interpulse polarization data follow exactly the same curve. (Note that the uncertainty of the pulsar geometry discussed above does not affect the validity of this result.) Given that the main pulse and interpulse originate on opposite sides of the neutron star, such an exact match would seem improbable. This improbable coincidence disappears if the main pulse and interpulse were to come from the same region, as in the bidirectional model of pulsar radio emission (Dyks, Zhang & Gil Reference Dyks, Zhang and Gil2005; Petrova Reference Petrova2008a ), where the two components are emitted from the same pole in the outward and backward directions, respectively (for details on the physical grounds of the model see § 2.2.2 below). General considerations as to the origin of the radio components coincident with and lagging the high-energy peaks are presented in § 3.2. As was pointed out by the referee, the bidirectional model for the gamma-ray emission might be physically realizable in the current sheet inside the light cylinder, in which case the space-like current should be supplied by the counter-streaming particle beams.

The technique of plasma density diagnostics developed in Petrova (Reference Petrova2003a ) and discussed above is based on a simplistic assumption of a cold non-gyrotropic plasma embedded in a superstrong dipolar magnetic field. In this case, the ellipticity and position angle shift of outgoing waves exhibit one-to-one correspondence, both being determined by the plasma characteristics in the polarization-limiting region. The position angle shift resulting from polarization evolution in the gyrotropic plasma is suggested as a potential probe of the global current of a pulsar (Hibschman & Arons Reference Hibschman and Arons2001a ). Further generalizations of the theory of polarization transfer in a pulsar plasma by including realistic energy distributions of the plasma particles as well as finiteness and non-dipolar character of the magnetic field (Petrova Reference Petrova2006a ,Reference Petrova b ; Wang, Lai & Han Reference Wang, Lai and Han2010; Beskin & Philippov Reference Beskin and Philippov2012) lead to a complicated picture of observational consequences. Because of its numerous ingredients, the picture is no longer transparent and can hardly allow us to solve an inverse problem of plasma diagnostics. Nevertheless, the elaborated theory can explain a number of observed polarization peculiarities and seems appropriate for direct modelling of the pulsar polarization profiles.

2.1.4 The role of cyclotron absorption in polarization evolution

In the vicinity of the radio emission region, the magnetic field is so strong that the electron gyrofrequency is much higher than the radio wave frequency in the particle rest frame, ${\it\omega}_{H}\equiv eB/mc\gg {\it\omega}^{\prime }$ . As the magnetic field strength decreases with distance from the neutron star, in the outer magnetosphere the radio wave frequencies meet the cyclotron resonance condition, ${\it\omega}^{\prime }={\it\omega}_{H}$ . As a rule, the cyclotron resonance occurs above the polarization-limiting region. If the two regions lie close to each other, the plasma number density in the resonance region is still high enough to cause further evolution of radio wave polarization (Petrova Reference Petrova2006a ). The cyclotron absorption coefficients of the ordinary and extraordinary natural modes are slightly different: the extraordinary waves are suppressed somewhat stronger. The waves coming into the resonance region are already a coherent mixture of the two natural modes, and since these components are absorbed differently, the outgoing polarization changes. In this case, the evolution of the two orthogonally polarized modes is distinct and they finally become non-orthogonal.

If the waves pass through the resonance before the polarization-limiting region, the extraordinary ones are strongly suppressed, whereas the ordinary ones suffer weaker polarization evolution, with the resultant circular polarization having the opposite sense (Petrova Reference Petrova2006a ).

The pulse-to-pulse variations of the radio pulse polarization can be attributed to the temporal fluctuations of the plasma characteristics. In particular, the fine peculiarities of single-pulse polarization statistics observed in PSR B0329+54 (Edwards & Stappers Reference Edwards and Stappers2004) and PSR B0818-13 (Edwards Reference Edwards2004) can be reproduced by numerical modelling of polarization transfer in the plasma with weak pulse-to-pulse fluctuations of the number density (Petrova Reference Petrova2006b ).

2.2 Induced scattering

The brightness temperatures of pulsar radio emission, $T_{B}\sim 10^{25}{-}10^{30}$  K, are so high that spontaneous scattering off the plasma particles is strongly dominated by the induced one (Blandford & Scharlemann Reference Blandford and Scharlemann1976; Wilson & Rees Reference Wilson and Rees1978). For typical conditions in the pulsar magnetosphere, the latter process can be efficient in a number of regimes. Induced scattering of plasma waves is thought of as an important constituent of the pulsar radio emission mechanism (Lyubarskii Reference Lyubarskii1996). Besides that, it can affect further propagation of radio waves in the magnetosphere.

Within the framework of the plasma mechanisms, pulsar radio emission is believed to be generated at the local Lorentz-shifted proper plasma frequency, ${\it\omega}\sim {\it\omega}_{p}\sqrt{{\it\gamma}}$ (for criticism of this statement see Melrose & Gedalin (Reference Melrose and Gedalin1999)). Therefore, close to the emission region, the induced scattering is a collective process. The transverse waves may also participate in the induced three-wave processes (Luo & Melrose Reference Luo and Melrose2006). A particular case of induced Raman scattering in pulsar magnetosphere was examined in Gangadhara & Krishan (Reference Gangadhara and Krishan1993), Lyutikov (Reference Lyutikov1998b ).

As the plasma number density rapidly decreases with distance from the neutron star, far enough from the emission region the collective effects are negligible. Then the plasma can be considered as a system of independent particles, whereas the incident radiation presents a mixture of the transverse electromagnetic waves polarized in the plane of the ambient magnetic field (the ordinary mode) and perpendicular to this plane (the extraordinary mode).

In the open field line tube of a pulsar, induced scattering by a system of particles may hold in different regimes, which are distinct in the role of the ambient magnetic field, in the transverse momentum of the scattering particles and in the characteristics of the final state of the scattered radiation. The induced scattering may lead to a substantial redistribution of radio intensity in pulse longitude and frequency and may have multitudinous observational consequences. Note that the characteristics of the radiation scattered in different regimes can be regarded as a tool for diagnostics of a pulsar plasma in different regions of the magnetosphere.

2.2.1 The case of superstrong magnetic field

In the inner magnetosphere, where the number density of the scattering particles is the largest, the induced scattering is expected to be most efficient. In this region, the radio frequency in the particle rest frame is much less than the electron gyrofrequency, ${\it\omega}^{\prime }\equiv {\it\omega}{\it\gamma}(1-{\it\beta}\cos {\it\theta})\ll {\it\omega}_{H}$ (where ${\it\omega}$ and ${\it\theta}$ are the photon frequency and tilt to the ambient magnetic field in the laboratory frame, ${\it\beta}$ and ${\it\gamma}$ are the particle velocity in units of $c$ and Lorentz factor). Then the magnetic field affects the scattering process, changing both the scattering cross-section and the geometry of particle recoil (Canuto, Lodenquai & Ruderman Reference Canuto, Lodenquai and Ruderman1971; Blandford & Scharlemann Reference Blandford and Scharlemann1976). In the regime of superstrong magnetic field, the scattering particles slide along the magnetic field lines and the transverse component of their perturbed motion in the field of an incident wave is suppressed as well. Correspondingly, only the photons with the ordinary polarization are involved in this type of scattering.

As the pulsar radio emission is related to the processes in the ultrarelativistic secondary plasma, at each point the radiation is concentrated into a narrow beam with opening angle ${\sim}1/{\it\gamma}$ . However, beams of substantially differing frequencies may have different orientations as a result of refraction and ray propagation in the rotating magnetosphere. The problem of induced scattering of radio photons between two beams of substantially different frequencies, ${\it\omega}_{1}$ and ${\it\omega}_{2}$ , and orientations with respect to the ambient magnetic field, ${\it\theta}_{1}$ and ${\it\theta}_{2}$ , is considered in Petrova (Reference Petrova2004b ). Of course, in the rest frame of the scattering particles, the beam frequencies are equal, ${\it\omega}_{1}^{\prime }={\it\omega}_{2}^{\prime }$ , and hence, in the laboratory frame they are related by ${\it\omega}_{1}(1-{\it\beta}\cos {\it\theta}_{1})={\it\omega}_{2}(1-{\it\beta}\cos {\it\theta}_{2})$ .

In case of a superstrong magnetic field, the induced scattering between the two beams of intensities $I_{1}$ and $I_{2}$ is shown to result in the net intensity transfer from the lower-frequency beam to the higher-frequency one, with the total intensity of the two beams remaining approximately constant, $I_{1}+I_{2}=\text{const}$ . For the decreasing spectrum of pulsar radio emission, $I\propto {\it\omega}^{-{\it\xi}}$ (where $I$ is the original intensity of the pulsar radiation and ${\it\xi}$ the spectral index) this may imply significant amplification of the higher-frequency intensity. For example, if ${\it\theta}_{1}/{\it\theta}_{2}\approx 3$ , then ${\it\omega}_{2}/{\it\omega}_{1}\approx 10$ and for ${\it\xi}=3$ the original intensity ratio of the beams is $I_{1}/I_{2}=({\it\omega}_{1}/{\it\omega}_{2})^{-{\it\xi}}\sim 10^{3}$ . Correspondingly, in the case of efficient scattering, the higher-frequency intensity may increase by three orders of magnitude. Thus, the induced scattering can account for the observed energetics of giant pulses.

It is evident that the amplification is stronger for pulsars with steeper radio spectra. Steepness of radio spectrum was suggested as a criterion for the search for new giant pulse sources (Petrova Reference Petrova2004b ). The three sources discovered subsequently do meet this criterion (Knight et al. Reference Knight, Bailes, Manchester, Ord and Jacoby2006b ,Reference Knight, Bailes, Manchester and Ord a ).

Propagation origin of giant pulses implies that their intensity statistics are determined by pulse-to-pulse fluctuations in the pulsar plasma. Given that the plasma number density and the original radio intensity are Gaussian random quantities, the distribution of strongly amplified pulses has a power-law form and may fit the intensity distributions of the observed giant pulses (Petrova Reference Petrova2004b ).

Induced scattering inside the narrow beam leads to photon focusing in the direction closest to the ambient magnetic field (Petrova Reference Petrova2004a ). As a result, the beam width may decrease by approximately two orders of magnitude, becoming compatible with the characteristic scale of the observed microstructure. In giant pulses, the focusing effect is believed to be much stronger and can be responsible for their substructure at nanosecond time scales. Note that the focusing effect resolves the difficulty of too high brightness temperatures of the nanopulses observed in the Crab pulsar (Hankins et al. Reference Hankins, Kern, Weatherall and Eilek2003).

Generally speaking, the power-law statistics and extremely short-scale structures are characteristic of nonlinear processes. In particular, the power-law intensity distribution of giant pulses and their nanosecond substructure can also be interpreted in terms of the wave collapse resulting from the nonlinear modulation instability (Weatherall Reference Weatherall1998; Cairns Reference Cairns2004).

2.2.2 Induced scattering into background

Because of the strong directivity of pulsar radio emission, the photon direction corresponding to the maximum scattering probability lies outside the photon beam. Hence, induced scattering in this direction is possible only in the presence of background radiation. The latter may arise, e.g. as a result of spontaneous scattering of the beam photons. Although the intensity of the background radiation is negligible compared to the beam intensity, $\log I_{\mathit{bg}}/I_{\mathit{beam}}\approx -10$ , in the case of strong enough induced scattering, with the scattering depth ${\it\Gamma}\approx 30$ , a substantial part of the original beam intensity can be transferred into the background, the photons being predominantly scattered in the direction of the maximum scattering probability (Lyubarskii & Petrova Reference Lyubarskii and Petrova1996).

In the regime of superstrong magnetic fields, the scattered component is directed approximately along the scattering particle velocity and the induced scattering is most efficient at the upper boundary of the scattering region (Petrova Reference Petrova2008c ). Because of rotational aberration in that region, in the pulse profile observed the scattered component should lead the main pulse by ${\leqslant}30^{\circ }$ and therefore can be identified with the precursor. Within the framework of this mechanism, the complete linear polarization of the precursor emission and its spectral peculiarities are explained naturally.

In the regime of a moderately strong magnetic field, ( $1/\sqrt{{\it\gamma}}\ll {\it\omega}^{\prime }/{\it\omega}_{H}\ll 1$ ), the induced scattering of pulsar radio emission into the background can also be efficient (Petrova Reference Petrova2008a ). In this case, the perturbed motion of the scattering particle presents a drift in the crossed electric field of the incident wave and the ambient magnetic field (Blandford & Scharlemann Reference Blandford and Scharlemann1976; Ochelkov & Usov Reference Ochelkov and Usov1983). Correspondingly, the scattering geometry and the properties of the scattered radiation are essentially distinct. In particular, photons of both polarizations are involved in the scattering, whereas the scattered component is antiparallel to the particle velocity and appears in the pulse profile as an interpulse. A comprehensive picture of the observed interpulse properties may well be explained in terms of induced scattering (Petrova Reference Petrova2008a ).

It is important to note that the scattering nature of the precursor and the interpulse implies a physical relation between these components and the main pulse. The observational manifestations of such a relation are already known. The first example concerns the pulsar PSR B1822-09 (Fowler, Morris & Wright Reference Fowler, Morris and Wright1981; Gil et al. Reference Gil, Jessner, Kijak, Kramer, Malofeev, Malov, Seiradakis, Sieber and Wielebinski1994). In the weak emission mode its radio profile exhibits the main pulse and interpulse, whereas in the bright mode it contains the precursor, the main pulse and a much weaker interpulse. Thus, the precursor and interpulse are anticorrelated, and their appearance is controlled by the main pulse intensity. The second example is the pulsar PSR B1702-19 (Weltevrede, Wright & Stappers Reference Weltevrede, Wright and Stappers2007), in which case the subpulse structure of the main pulse and interpulse is modulated with exactly the same periodicity, testifying to the correlation of the instantaneous intensities of the two components.

2.2.3 Induced scattering by relativistically gyrating particles

The radio emission structure of the Crab pulsar presents an exceptional case. The radio profile contains a total of seven components spread out over the whole pulse period and characterized by distinct spectral and polarization properties (Moffett & Hankins Reference Moffett and Hankins1996, Reference Moffett and Hankins1999). At the lowest frequencies, the profile consists of the precursor, the main pulse and the interpulse, which have very steep spectra and disappear at higher frequencies. As the frequency increases, the precursor is replaced by the so-called low-frequency component (LFC) located at the earlier pulse phase, and instead of the interpulse there appears the high-frequency interpulse (IP $^{\prime }$ ) also shifted toward earlier phases as well as the pair of trailing high-frequency components (HFC1 and HFC2).

In order to explain this complicated picture, the theory of induced scattering is generalized to the case of relativistically gyrating particles (Petrova Reference Petrova2008b ,Reference Petrova d , Reference Petrova2009b ). In the inner magnetosphere, the magnetic field of a pulsar is so strong that any transverse momentum of the plasma particles is almost immediately lost via synchrotron re-emission. At higher altitudes, however, the particles acquire relativistic gyration as a result of resonant absorption of radio emission (see § 2.3 below). As the pulsar radio beam is broadband, ${\it\nu}\sim 10^{7}{-}10^{10}$ Hz, the resonance region appears quite extended in altitude. Therefore the lower-frequency radio waves are subject to strong-field scattering by the particles performing relativistic gyration because of resonance absorption of the higher-frequency radio emission.

At the conditions relevant to a pulsar magnetosphere, the induced scattering by relativistically gyrating particles may be efficient for several lowest harmonics of the gyrofrequency. In particular, the precursor and LFC of the Crab pulsar can be attributed to the main pulse scattering at the zeroth harmonic and from the first to the zeroth one, respectively (Petrova Reference Petrova2008d ). In this case, the location of the two components on the pulse profile, their spectral behaviour and high linear polarization are explained naturally.

Furthermore, the interpulse, IP $^{\prime }$ , HFC1 and HFC2 can be interpreted as the consequence of subsequent induced scattering of the main pulse, precursor and LFC, respectively, in the regime of a moderately strong magnetic field (Petrova Reference Petrova2009b ). Then HFC1 and HFC2 are actually a single component split by rotational aberration close to the light cylinder. Note that approximate constancy of the position angle of linear polarization across this component (Moffett & Hankins Reference Moffett and Hankins1999) testifies to its origin in the outer magnetosphere.

As is shown in Petrova (Reference Petrova2009b ), the fine structure in the observed dynamic spectrum of giant IP $^{\prime }$ s (Hankins & Eilek Reference Hankins and Eilek2007; Hankins, Jones & Eilek Reference Hankins, Jones and Eilek2015) can be identified with the structure of the giant main pulses modified by induced scattering in the channel ‘main pulse $\rightarrow$ precursor $\rightarrow$ IP $^{\prime }$ ’. The fine structure of the giant main pulses itself has also recently been interpreted in terms of induced scattering (Tanaka, Asano & Terasawa Reference Tanaka, Asano and Terasawa2015).

The implications of induced scattering of pulsar radio emission are not exhausted by those outlined above. The scattered components of the millisecond pulsars are addressed in § 3.2.

2.3 Radio photon reprocessing to high energies

The radio emission, whose luminosity is only a tiny fraction of the total luminosity of a pulsar, is believed to be generated by some coherent mechanism acting in the plasma flow above the polar gap (e.g. Lyubarsky Reference Lyubarsky1995; Melrose Reference Melrose2003; Lyubarsky Reference Lyubarsky2008). The pulsar high-energy emission is commonly associated with the incoherent curvature, synchrotron and inverse Compton emission from the slot (e.g. Muslimov & Harding Reference Muslimov and Harding2004; Harding et al. Reference Harding, Stern, Dyks and Frackowiak2008) or outer (Romani Reference Romani1996; Cheng, Ruderman & Zhang Reference Cheng, Ruderman and Zhang2000; Hirotani Reference Hirotani2006) gap or from the current sheet both inside and outside the light cylinder (Cerutti et al. Reference Cerutti, Philippov and Spitkovsky2016). In the case of very-high-energy emission, the mechanism is either inverse Compton emission from the outer magnetosphere (Lyutikov, Otte & McCann Reference Lyutikov, Otte and McCann2012; Lyutikov Reference Lyutikov2013; Harding & Kalapotharakos Reference Harding and Kalapotharakos2015) or synchrotron emission from the region beyond the light cylinder (Pétri Reference Pétri2012; Kalapotharakos et al. Reference Kalapotharakos, Harding and Kazanas2014; Uzdensky & Spitkovsky Reference Uzdensky and Spitkovsky2014; Brambilla et al. Reference Brambilla, Kalapotharakos, Harding and Kazanas2015; Mochol & Pétri Reference Mochol and Pétri2015).

Thus, pulsar emissions in the radio and higher-energy ranges are essentially distinct. Nevertheless, their correlation is strongly expected, since any emission is undoubtedly attributed to the plasma particles. Any observational manifestation of such a correlation is believed to be a unique probe of the pulsar plasma characteristics and the pulsar magnetosphere as a whole. For the two decades, a targeted search for a correlation between the giant radio pulses and gamma-ray emission of the Crab pulsar has failed to yield positive results (Lundgren et al. Reference Lundgren, Cordes, Ulmer, Matz, Lomatch, Foster and Hankins1995; Ramanamurthy & Thompson Reference Ramanamurthy and Thompson1998; Bilous et al. Reference Bilous, Kondratiev, Mclaughlin, Ransom, Lyutikov, Mickaliger and Langston2011, Reference Bilous, Mclaughlin, Kondratiev and Ransom2012; Aliu et al. Reference Aliu, Archambault, Arlen, Aune, Beilicke, Benbow, Bouvier, Buckley, Bugaev and Byrum2012). Instead, the observational manifestations of the radio–high-energy connection were found at softer energies. (For a discussion of the radio–gamma-ray correlation in millisecond pulsars see § 3.2)

The optical pulses coincident with giant radio pulses of the Crab pulsar are 3% brighter than the average pulse (Shearer et al. Reference Shearer, Stappers, O’Connor, Golden, Strom, Redfern and Ryan2003; Oosterbroek et al. Reference Oosterbroek, Cognard, Golden, Verhoeve, Martin, Erd, Schulz, Stüwe, Stankov and Ho2008; Strader et al. Reference Strader, Johnson, Mazin, Spiro Jaeger, Gwinn, Meeker, Szypryt, van Eyken, Marsden and O’Brien2013). Although the Vela pulsar does not exhibit classical giant pulses, it is known for its prominent intensity variations accompanied by radio profile changes (Krishnamohan & Downs Reference Krishnamohan and Downs1983). Namely, the intensity ratio of the precursor and the main pulse increases with radio intensity. Furthermore, the X-ray profile of the Vela pulsar integrated over the range 2–16 keV is found to change with radio intensity as well (Lommen et al. Reference Lommen, Donovan, Gwinn, Arzoumanian, Harding, Strickman, Dodson, McCulloch and Moffett2007). The changes touch the main peak and the leading trough, which latter presents a separate component at softer energies and passes through the spectral peak at a few tenths of a keV (Harding et al. Reference Harding, Strickman, Gwinn, Dodson, Moffet and McCulloch2002).

Note that in both pulsars the high-energy fluctuations correlated with the radio emission are much less marked than the radio pulse changes and, in the Vela case, touch not only the total flux but also the profile shape. The connection of such a type can hardly be attributed to the global changes in the magnetosphere and can rather be interpreted in terms of radio photon reprocessing to high energies.

2.3.1 Resonant absorption of radio emission

In the inner magnetosphere, the plasma particles are at the ground Landau orbital due to extremely strong synchrotron re-emission. In the outer magnetosphere, in the region of cyclotron resonance of the radio waves, the particles can absorb and emit resonant photons, performing transitions between the Landau orbitals. In total, the incident radio emission is partially absorbed, whereas the particle pitch angle ${\it\psi}\equiv p_{\bot }/p_{\Vert }$ (where $p_{\bot }$ and $p_{\Vert }$ are the transverse and longitudinal components of the particle momentum, respectively) increases monotonically. Note that because of much weaker magnetic field synchrotron re-emission no longer prevents the momentum growth. In pulsar magnetospheres, the process of resonant absorption can be very efficient (Blandford & Scharlemann Reference Blandford and Scharlemann1976; Mikhailovskii et al. Reference Mikhailovskii, Onishchenko, Suramlishvili and Sharapov1982; Lyubarskii & Petrova Reference Lyubarskii and Petrova1998b ). On the one hand, this poses the problem of radio wave escape from the pulsar magnetosphere. On the other hand, as soon as the particles acquire substantial pitch angles, the very character of the absorption changes (Lyubarskii & Petrova Reference Lyubarskii and Petrova1998b ).

At the initial stage, the particle pitch angle grows rapidly up to values ${\it\psi}\approx {\it\theta}\sim 0.1$ (where ${\it\theta}$ is the incident angle of the resonant photons). Later on, the total particle momentum $p$ increases so as to satisfy the condition $p({\it\theta}-{\it\psi})=\text{const}$ . The estimates show that in pulsars, only the highest radio frequencies, ${\it\nu}>10$ GHz suffer resonant absorption in the regime ${\it\psi}\ll {\it\theta}$ , whereas over the rest of the radio range the radiation is absorbed in the regime ${\it\theta}-{\it\psi}\ll {\it\theta}$ , in which case the particle momenta can increase by 2–3 orders of magnitude (Petrova Reference Petrova2002).

The optical depth to resonant absorption in the regime ${\it\theta}-{\it\psi}\ll {\it\theta}$ is much less than that in the regime ${\it\psi}\ll {\it\theta}$ , and it is the former quantity that determines the total radio luminosity of a pulsar. For the long-period and millisecond pulsars, the optical depth is small, and their radio emission freely escapes from the magnetosphere. In the short-period normal pulsars, the optical depth is roughly of order unity, so that their radio emission may be substantially suppressed. As is argued in § 3.1 below, the resonant absorption can account for the radio quietness of young gamma-ray pulsars.

2.3.2 Spontaneous synchrotron re-emission

The synchrotron radiation of the particles with the evolved momenta falls into the optical and soft X-ray ranges. Spontaneous re-emission of the particles taking part in the resonant absorption of radio waves was suggested as a mechanism of the pulsar high-energy emission (Lyubarskii & Petrova Reference Lyubarskii and Petrova1998b ; Gil, Khechinashvili & Melikidze Reference Gil, Khechinashvili and Melikidze2001; Petrova Reference Petrova2003b ). The model was subsequently elaborated by including the accelerating electric field and applied to the cases of partially screened polar gap and slot gap (Harding, Usov & Muslimov Reference Harding, Usov and Muslimov2005; Harding et al. Reference Harding, Stern, Dyks and Frackowiak2008; Harding & Kalapotharakos Reference Harding and Kalapotharakos2015). It is important to note that the mechanism based on synchrotron re-emission for the first time implies the physical connection between the radio and high-energy emissions of a pulsar (Petrova Reference Petrova2003b ). In particular, the observed excess of optical emission during giant radio pulses of the Crab pulsar (Shearer et al. Reference Shearer, Stappers, O’Connor, Golden, Strom, Redfern and Ryan2003; Oosterbroek et al. Reference Oosterbroek, Cognard, Golden, Verhoeve, Martin, Erd, Schulz, Stüwe, Stankov and Ho2008; Strader et al. Reference Strader, Johnson, Mazin, Spiro Jaeger, Gwinn, Meeker, Szypryt, van Eyken, Marsden and O’Brien2013) can be understood as follows. As a giant pulse comes into the resonance region, the momentum evolution of the particles becomes more pronounced and their synchrotron emission is stronger.

2.3.3 Spontaneous scattering by relativistically gyrating particles

At the conditions relevant to pulsar magnetospheres, radio photons can also be reprocessed to high energies in another way. Over most of the resonance region there is a significant amount of under-resonance photons, with frequencies ${\it\omega}^{\prime }\ll {\it\omega}_{H}$ , which can be scattered off the relativistically gyrating particles. This process differs essentially from the common magnetized scattering by straight moving particles (Petrova Reference Petrova2008b ). The under-resonance photons are chiefly scattered to high harmonics of the particle gyrofrequency, ${\it\omega}_{sc}^{\prime }={\it\omega}^{\prime }+s{\it\omega}_{H}$ with $s\sim {\it\gamma}_{0}^{3}$ (where ${\it\gamma}_{0}$ is the Lorentz factor of the particle gyration), and the total scattering cross-section is much larger. Furthermore, the peak of the scattered radiation is markedly shifted in frequency beyond the synchrotron maximum. Correspondingly, although the total power scattered is always less than the synchrotron power, in the region beyond the synchrotron maximum the contribution of the scattered radiation can be substantial.

As is shown in Petrova (Reference Petrova2009a ), the spontaneous scattering of under-resonance radio photons off the relativistically gyrating particles can explain the radio–X-ray correlation observed in the Vela pulsar (Lommen et al. Reference Lommen, Donovan, Gwinn, Arzoumanian, Harding, Strickman, Dodson, McCulloch and Moffett2007). The scattered power appears to be a very strong function of the particle gyration energy, $L_{\text{sc}}\propto {\it\gamma}_{0}^{6}$ , and the quantity ${\it\gamma}_{0}$ is determined by the radio intensity coming into the resonance region and causing the particle momentum evolution. Thus, it is the scattered power that is tightly connected with the radio emission characteristics, and this connection should be most prominent beyond the synchrotron maximum. Recall that in the Vela pulsar the trough component is indeed noticeably connected with the radio emission beyond its spectral maximum. The numerical estimates as applied to this pulsar give reasonable results. In the observer frame, the peaks of the synchrotron and scattered radiation, $\hbar {\it\omega}_{syn}=0.2$ keV and $\hbar {\it\omega}_{sc}=1.5$ keV, agree well with the spectral maximum of the trough component and the range of its pronounced correlation with radio emission, while the total synchrotron power, $L_{syn}=10^{31}$ erg s $^{-1}$ , is compatible with the observed luminosity of this component.

The radio beam is also subject to induced scattering off the gyrating particles. In contrast to the spontaneous scattering considered above, the induced scattering is most efficient between the states below the resonance, ${\it\omega}_{sc}^{\prime }={\it\omega}^{\prime }$ , and can modify the radio profile shape (for details see § 2.2 above). Note that the efficiency of induced scattering is also a function of the particle gyration energy ${\it\gamma}_{0}$ . Hence, the variations of ${\it\gamma}_{0}$ should lead to joint fluctuations in the radio and high-energy emission, and the radio–high-energy connection in the Vela pulsar can be understood as the interplay between the processes of spontaneous and induced scattering by the gyrating particles (Petrova Reference Petrova2009a ).

3 Implications for gamma-ray pulsars

The radio propagation effects considered in the previous section can explain a number of peculiarities observed in the radio emission of gamma-ray pulsars and can potentially give valuable information as to the magnetospheric plasma of these objects. Different effects can be combined to form a comprehensive physical picture of the pulsar magnetosphere. Here we discuss the specific observational manifestations of radio propagation effects, which could only be revealed by joint radio and gamma-ray studies of pulsars.

3.1 Young energetic pulsars

One of the unexpected results of Fermi LAT is the discovery of an abundant population of radio quiet pulsars. Approximately half of young gamma-ray pulsars are radio quiet, whereas all known millisecond pulsars are radio loud (e.g. Abdo et al. Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013). The radio quietness is commonly attributed to an unfavourable orientation of the pulsar with respect to an observer (see, e.g. Abdo et al. (Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013) and references therein). Such an interpretation is in part motivated by the absence of marked differences in the gamma-ray emission of the radio quiet and radio loud pulsars. Here we argue that the radio quietness may be caused by a physical rather than geometrical effect.

As is demonstrated in figure 3, the light cylinder magnetic field of the pulsars, $B_{LC}$ , increases with the rate of rotational energy loss, ${\dot{E}}$ , with the young gamma-ray pulsars being characterized by the largest values of these quantities among the normal radio pulsars. The distribution of short-period ( $P=0.03{-}0.5$ s) radio pulsars in $B_{LC}$ (see figure 4 a) peaks at $\log B_{LC}\approx 2.5$ and shows noticeable asymmetry, testifying to the deficit of higher- $B_{LC}$ pulsars. The population of young gamma-ray pulsars has $\log B_{LC}>2.5$ , occupying the region beyond the peak (cf. figure 4 b). Furthermore, as can be noticed from the latter figure, the radio quiet pulsars tend to have lower $B_{LC}$ than the radio loud ones. Presumably this trend would be even more pronounced if the actual inclination angles and a realistic magnetic field geometry were taken into account.

Figure 3. Light cylinder magnetic field versus the rate of rotational energy loss. The radio pulsar data are taken from the ATNF Pulsar Catalogue (http://atnf.csiro.au/people/pulsar/psrcat), the gamma-ray pulsar data from the LAT Second Pulsar Catalog (http://fermi.gsfc.nasa.gov/ssc/data/access/lat/2nd_PSR_catalog).

Figure 4. Distribution of pulsars in the light cylinder magnetic field; (a) short-period (0.03–0.5 s) radio pulsars from the ATNF Pulsar Catalogue, (b) young radio loud (white) and radio quiet (grey) gamma-ray pulsars from Abdo et al. (Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013), (c) gamma-ray millisecond pulsars from Abdo et al. (Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013).

The above results lead us to suggest that the radio quietness of pulsars can be explained in terms of resonant absorption. The problem of too high absorption depths in pulsars was recognized long ago (Blandford & Scharlemann Reference Blandford and Scharlemann1976). Gil et al. (Reference Gil, Khechinashvili and Melikidze2001) attributed the radio quietness of Geminga to cyclotron absorption. The treatment of synchrotron absorption (Lyubarskii & Petrova Reference Lyubarskii and Petrova1998b ; Petrova Reference Petrova2002) removed the problem of radio wave escape from the long-period and millisecond pulsars, whereas in the short-period normal pulsars the absorption depths can still be substantial (for details see § 2.3.1).

Keeping in mind that the synchrotron absorption depth ${\it\Gamma}$ is a strong enough function of the poorly known pulsar geometry, one can still expect that as long as $\log B_{LC}<2.5$ the value of ${\it\Gamma}$ is less than unity, allowing free escape of radio waves from the bulk of short-period normal radio pulsars. As ${\it\Gamma}$ increases with $B_{\text{LC}}$ , the pulsars corresponding to the region beyond the peak in figure 4(a) may suffer substantial synchrotron absorption and become radio quiet. On the other hand, as $B_{LC}$ increases further, the resonance region moves to higher altitudes in the magnetosphere. Then, given sufficiently rapid rotation of a pulsar, the radio beam meets the resonance at the periphery of the open field line tube. Thus, the radio waves acquire a chance to escape through the outer gap, the closed field line region, etc., making the pulsar radio loud. Note that the radio loud pulsars are indeed characterized by shorter periods (e.g. Abdo et al. Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013) and higher $B_{LC}$ (see figure 4 b).

As is found in Marelli et al. (Reference Marelli, Mignani, De Luca, Saz Parkinson, Salvetti, Den Hartog and Wolff2015), the radio loud and radio quiet pulsars differ in X-ray flux, though their X-ray spectra and gamma-ray properties are the same. Traditionally, the authors interpret this on geometrical grounds: they hypothesize the existence of a separate X-ray component close to the magnetic axis, so that its visibility depends on the pulsar orientation with respect to an observer, similar to the radio beam visibility.

The difference in the X-ray emission of the radio loud and radio quiet pulsars can also be interpreted in terms of propagation effects. Given that the radio flux is severely absorbed, the radio wave scattering by relativistically gyrating particles, which reprocesses the photons into the X-ray range (see § 2.3.3), does not hold. Hence, the radio quiet pulsars lack the corresponding X-ray component. It is still questionable, however, if the radio photon reprocessing in radio loud pulsars can account for the energetics of the additional X-ray component observed.

3.2 Millisecond pulsars

The population of gamma-ray millisecond pulsars also exhibits increase of $B_{LC}$ with ${\dot{E}}$ (see figure 3). The law of increase is roughly the same as in the young energetic pulsars, except for the overall shift toward lower ${\dot{E}}$ by approximately two orders of magnitude. Interestingly, the maximum $B_{LC}$ and minimum ${\dot{E}}$ are the same for both populations, whereas the minimum $B_{LC}$ in the millisecond pulsars roughly corresponds to the upper limit for the radio quiet pulsars (cf. figure 4 b,c). This correspondence, along with a sharp cutoff in the distribution of the millisecond pulsars at low $B_{LC}$ (see figure 4 c) excites a doubt as to the absence of radio quiet or radio dim millisecond pulsars in nature.

As can be drawn from figure 5(a, b), the radio luminosity of the millisecond pulsars is an increasing function of both ${\dot{E}}$ and $B_{LC}$ , in contrast to the other radio pulsars. One of the consequences is that weak radio millisecond pulsars are probably dim in gamma rays as well, since the gamma-ray luminosity is known to increase with ${\dot{E}}$ (e.g. Abdo et al. Reference Abdo, Ajello, Allafort, Baldini, Ballet, Barbiellini, Baring, Bastieri, Belfiore and Bellazzini2013). Then it is hard to discover such objects in any range. Perhaps radio dim and radio quiet millisecond pulsars are yet to be detected.

Figure 5. Radio emission properties of normal and millisecond pulsars versus fundamental parameters; (a) the radio efficiency, $L_{radio}/{\dot{E}}$ , as function of the rate of rotational energy loss; (b) the radio luminosity as function of the light cylinder magnetic field. The data are taken from the ATNF Pulsar Catalogue.

A similar conclusion was made quite recently in Calore et al. (Reference Calore, Di Mauro, Donato, Hessels and Weniger2015) based on an analysis of the direct dependency between the radio and gamma-ray luminosities of the millisecond pulsars, which was called the radio/gamma-ray correlation. (Note that in this case the term ‘correlation’ concerns a joint change of the average radio and gamma-ray luminosities from pulsar to pulsar rather than simultaneous temporal fluctuations of radiation in the two ranges, as is discussed in § 2.3 for the Crab pulsar.) The authors do not discuss its physical nature, and our speculations are given below.

Besides a hint at the radio/gamma-ray correlation, figure 5 raises one more interesting question: why the millisecond pulsars exhibit so much different behaviour of the radio luminosity as compared to the normal radio pulsars. The radio observations provide the bulk of the evidence that the radio properties of the normal and millisecond pulsars do not differ dramatically (e.g. Kramer et al. Reference Kramer, Xilouris, Lorimer, Doroshenko, Jessner, Wielebinski, Wolszczan and Camilo1998), strongly testifying to the action of the same radio emission mechanism. We suggest that propagation effects control the radio luminosities of the millisecond pulsars.

As is already mentioned in § 3.1, higher values of $B_{LC}$ imply that the resonance region of the radio waves lies higher in the magnetosphere. In the case of millisecond pulsars, the rotational effect is so strong that the radio beam may deflect into the outer/slot gap region even before the resonance. Then the radio beam interacts with the plasma flow, which is also a source of high-energy emission, and, in particular, may suffer induced scattering in different regimes, starting with the strong-field scattering.

The induced scattering of the radio beam in different regimes may account for the additional components in the radio profiles of the millisecond pulsars. Because of concurrent scattering in the two polarization channels, the scattered emission may have low linear polarization. As the radio beam scattering takes place in the narrow regions of the outer magnetosphere, the position angle of linear polarization should be almost constant across the scattered components. We suggest a flat position angle curve as a definitive signature of the scattered components, as opposed to the S-shaped curve characteristic of the main pulse originating in the inner magnetosphere. The properties of the scattered components are in a general agreement with those observed (for a comprehensive survey of the radio polarization profiles of millisecond pulsars see Dai et al. (Reference Dai, Hobbs, Manchester, Kerr, Shannon, van Straten, Mata, Bailes, Bhat and Burke-Spolaor2015)).

Note that the overall energetics of the radio profile containing the scattered components may be higher, on account of the energy taken from the scattering particles and because of intensity transfer between substantially different spectral regions. The light cylinder magnetic field predetermines the locus of the scattering regions, whereas the rate of rotational energy loss controls the energetics of the scattering particles, so that the resultant radio luminosity is indeed expected to depend on both $B_{LC}$ and ${\dot{E}}$ .

Within the framework of our considerations, the radio/gamma-ray correlation in the millisecond pulsars can be explained by the fact that the two types of emission result from the same plasma flow related to the outer/slot gap. Note that an idea of direct generation of radio emission in the high-altitude gaps (e.g. Espinoza et al. Reference Espinoza, Guillemot, Celik, Weltevrede, Stappers, Smith, Kerr, Zavlin, Cognard and Eatough2013; Bilous et al. Reference Bilous, Pennucci, Demorest and Ransom2015) encounters the difficulty of providing the necessary coherence in the outer magnetosphere. Therefore the propagation origin of the radio components correlating with gamma-ray emission seems preferable.

The induced scattering may give rise to the radio components leading and lagging the gamma-ray peak as well as those shifted by approximately half of a period from the main pulse. In a particular case when the radio and gamma-ray components are aligned, they are generated not only by the same particles but also at the same place. A correlation of such a sort (the coincidence of radio and gamma-ray components is termed radio/gamma-ray correlation, e.g. in Espinoza et al. (Reference Espinoza, Guillemot, Celik, Weltevrede, Stappers, Smith, Kerr, Zavlin, Cognard and Eatough2013)) is believed to be most informative and can be a useful tool for plasma diagnostics in the high-altitude gaps.

In the most studied case of PSR J1939+2134, which represents the classic example of the coincident radio and gamma-ray peaks, the primordial main radio pulse (exhibiting an S-shaped position angle swing and, correspondingly, originating in the inner magnetosphere) actually precedes the gamma-ray peak, appears strongly suppressed and does not even look like a separate component (see, e.g. Dai et al. Reference Dai, Hobbs, Manchester, Kerr, Shannon, van Straten, Mata, Bailes, Bhat and Burke-Spolaor2015). It is the other component, with the flat position angle curve and low linear polarization, that is responsible for the radio peak in the profile and coincides with the gamma-ray component. Recall that the radio interpulse of this pulsar is also strongly suggested to result from backward scattering (see § 2.1.3). Furthermore, it is the coincident radio components that show the giant pulse phenomenon which can also be attributed to the induced scattering (see § 2.2.1).

In view of the above considerations, it becomes clear why the Crab pulsar, unique among the young pulsars, bears close resemblance to the gamma-ray millisecond pulsars. Its light cylinder magnetic field is similar to that of the millisecond pulsars, and the period is short enough for the strong-field induced scattering of the radio beam to take place in the region of the high-altitude magnetospheric gaps. The scattering nature of the Crab’s radio components was discussed in § 2.2.3.

4 Outlook

The propagation concept reviewed above proves to be fruitful for pulsar studies. It not only allows us to explain, and sometimes to predict, the phenomena observed in pulsar radio emission but also gives a unique opportunity to probe the pulsar magnetospheric plasma. For many years, propagation studies have developed independently of the poorly known magnetospheric picture and radio emission mechanism, being practically the only means intended to link the radio emission theory and observations.

The observational progress of the last decade has changed this situation drastically. The non-stationary phenomena in pulsar radio emission, such as moding and nulling (Wang, Manchester & Johnston Reference Wang, Manchester and Johnston2007), rotating radio transients (McLaughlin et al. Reference McLaughlin, Lyne, Lorimer, Kramer, Faulkner, Manchester, Cordes, Camilo, Possenti and Stairs2006) and pulsar intermittency (Kramer et al. Reference Kramer, Lyne, O’Brien, Jordan and Lorimer2006), which are in the focus of current research, challenge the classic theory of the pulsar magnetosphere, especially in view of the relation found between the radio emission properties and the pulsar slowdown (Lyne et al. Reference Lyne, Hobbs, Kramer, Stairs and Stappers2010). The gamma-ray studies of pulsars also require an advanced magnetospheric theory.

The last decade is marked with a substantial progress in modelling of the pulsar force-free magnetosphere (e.g. Spitkovsky Reference Spitkovsky2006; Tchekhovskoy et al. Reference Tchekhovskoy, Spitkovsky and Li2013; Philippov et al. Reference Philippov, Spitkovsky and Cerutti2015). The force-free theory will hopefully be a proper basis for ultimately clarifying the pulsar emission mechanisms. In this context, the radio propagation theory has great perspectives as to interpretation of observations and diagnostics of the force-free magnetosphere.

Acknowledgements

The author is grateful to the anonymous referees for their constructive comments and suggestions. The paper have used the data from the ATNF Pulsar Catalogue, the EPN Database of Pulsar Radio Profiles, and the LAT Second Pulsar Catalog.

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Figure 0

Figure 1. Pulsar geometry; the magnetic moment and the line of sight are inclined to the rotation axis at the angles ${\it\alpha}$ and ${\it\zeta}$, respectively, ${\it\beta}\equiv {\it\zeta}-{\it\alpha}$ is the impact angle and ${\it\psi}$ the geometrically defined position angle.

Figure 1

Figure 2. Plasma density profiles for the Vela (a) and the millisecond gamma-ray pulsars J1446-4701, J1744-1134 and J1939+2134 (b); ${\it\kappa}$ is the plasma multiplicity defined as the number density normalized to the Goldreich–Julian number density, ${\it\chi}$ the polar angle of a point inside the open field line tube, ${\it\chi}_{f}$ the polar angle of the tube boundary at the corresponding altitude. The circles, squares and triangles in the upper panel mark the points obtained from the polarization data of Johnston, Karastergiou & Willett (2006), Karastergiou & Johnston (2006) at 1.4, 3.1 and 8.4 GHz, respectively. The points in the lower panel are obtained from the polarization profiles of Dai et al. (2015) at 1.4 GHz; the squares and circles correspond to the main pulse and interpulse data, respectively. The polarization profiles are available via the EPN Database of Pulsar Profiles at http://www.epta.eu.org/epndb. The geometry assumed is as follows: ${\it\alpha}=35.6^{\circ }$, ${\it\beta}=4^{\circ }$ for the Vela, ${\it\alpha}=60^{\circ }$, ${\it\beta}=5^{\circ }$ for J1446-4701, ${\it\alpha}=40^{\circ }$, ${\it\beta}=1.5^{\circ }$ for J1744-1134 and ${\it\alpha}=79^{\circ }$, ${\it\beta}=4^{\circ }$ for J1939+2134, where ${\it\alpha}$ is the pulsar inclination and ${\it\beta}$ the impact angle.

Figure 2

Figure 3. Light cylinder magnetic field versus the rate of rotational energy loss. The radio pulsar data are taken from the ATNF Pulsar Catalogue (http://atnf.csiro.au/people/pulsar/psrcat), the gamma-ray pulsar data from the LAT Second Pulsar Catalog (http://fermi.gsfc.nasa.gov/ssc/data/access/lat/2nd_PSR_catalog).

Figure 3

Figure 4. Distribution of pulsars in the light cylinder magnetic field; (a) short-period (0.03–0.5 s) radio pulsars from the ATNF Pulsar Catalogue, (b) young radio loud (white) and radio quiet (grey) gamma-ray pulsars from Abdo et al. (2013), (c) gamma-ray millisecond pulsars from Abdo et al. (2013).

Figure 4

Figure 5. Radio emission properties of normal and millisecond pulsars versus fundamental parameters; (a) the radio efficiency, $L_{radio}/{\dot{E}}$, as function of the rate of rotational energy loss; (b) the radio luminosity as function of the light cylinder magnetic field. The data are taken from the ATNF Pulsar Catalogue.