On the power free values of polynomials

C. Hooley

doi:10.1112/S002557930000797X

Extract

In 1953 Erdős† proved in a characteristically ingenious manner that an irreducible‡; integral polynomial f(n) of degree r ≥ 3 represents (r – 1)-free integers (that is to say integers not divisible by an (r – 1)th power other than 1) infinitely often, provided that the obvious necessary condition be given that f(n) have no fixed (r – 1)th power divisors other than 1. His method did not, however, give a means for determining an asymptotic formula for N(x), the number of positive integers n not exceeding x for which f(n) is (r – 1)-free, nor did it even show that the positive integers n for which f(n) is (r – 1)-free had a positive lower density.

References

^{page 21 note †} “Arithmetical properties of polynomials”, Journal London Math. Soc, 28 (1953), 416–425.Google Scholar

^{page 21 note ‡} Erdós also considers reducible polynomials, but these present neither the same interest nor difficulty.

^{page 21 note §} “On the square-free values of cubic polynomials”, Crelle 1966 (in the press). We shall refer to this subsequently as [I].

^{page 24 note †} “Sur les courbes algébriques et les varietes qui s'en d'duisent”, Actuel Scientif. Industr., 1041 (Paris, 1948).Google Scholar

^{page 24 note ‡} This uniformity is perhaps most quickly appreciated in this case by appealing to Weil's theory of character sums.

^{page 25 note †} Journal London Mart. Soc, 27 (1952), 7–15; Lemma 10.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Kátai, I. 1969. On the distribution of arithmetical functions. Acta Mathematica Academiae Scientiarum Hungaricae, Vol. 20, Issue. 1-2, p. 69.

Laurincikas, A. 1974. The distribution of the values of arithmetic functions defined on a polynomial set. Lithuanian Mathematical Transactions, Vol. 14, Issue. 1, p. 62.

Nair, M. 1976. Power free values of polynomials. Mathematika, Vol. 23, Issue. 2, p. 159.

1988. Elementary Theory of Numbers. Vol. 31, Issue. , p. 482.

Stewart, C. L. and Top, J. 1995. On ranks of twists of elliptic curves and power-free values of binary forms. Journal of the American Mathematical Society, Vol. 8, Issue. 4, p. 943.

LOUBOUTIN, Stéphane 1997. Class-group problems for cubic number fields. Japanese journal of mathematics. New series, Vol. 23, Issue. 2, p. 365.

Fouvry, Etienne 2000. Development of Mathematics, 1950–2000. p. 485.

Poonen, Bjorn 2003. Squarefree values of multivariable polynomials. Duke Mathematical Journal, Vol. 118, Issue. 2,

Luca, Florian and Pacelli, Allison M. 2008. Class groups of quadratic fields of 3-rank at least 2: Effective bounds. Journal of Number Theory, Vol. 128, Issue. 4, p. 796.

Heath-Brown, D.R. 2009. Sums and differences of three kth powers. Journal of Number Theory, Vol. 129, Issue. 6, p. 1579.

Browning, T. D. 2011. Power-free values of polynomials. Archiv der Mathematik, Vol. 96, Issue. 2, p. 139.

Narkiewicz, Władysław 2012. Rational Number Theory in the 20th Century. p. 131.

Rudnick, Zeév 2014. Square-free values of polynomials over the rational function field. Journal of Number Theory, Vol. 135, Issue. , p. 60.

Filaseta, M. Graham, S. and Trifonov, O. 2015. Starting with gaps between k-free numbers. International Journal of Number Theory, Vol. 11, Issue. 05, p. 1411.

Reuss, T. 2015. Power‐free values of polynomials. Bulletin of the London Mathematical Society, Vol. 47, Issue. 2, p. 270.

Xiao, Stanley Yao 2016. Power-Free Values of Binary Forms and the Global Determinant Method. International Mathematics Research Notices, p. rnw165.

Lapkova, K. 2016. On the k-free values of the polynomial $${xy^k + C}$$ x y k + C. Acta Mathematica Hungarica, Vol. 149, Issue. 1, p. 190.

Jones, Lenny and Phillips, Tristan 2018. Infinite families of monogenic trinomials and their Galois groups. International Journal of Mathematics, Vol. 29, Issue. 05, p. 1850039.

Desjardins, Julie 2019. On the variation of the root number in families of elliptic curves. Journal of the London Mathematical Society, Vol. 99, Issue. 2, p. 295.

Lapkova, Kostadinka and Xiao, Stanley Yao 2019. DENSITY OF POWER‐FREE VALUES OF POLYNOMIALS. Mathematika, Vol. 65, Issue. 4, p. 1038.

Download full list

Article contents

On the power free values of polynomials

Extract

Access options

References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

On the power free values of polynomials

Extract

Access options

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests