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Harmonic typically real mappings

Published online by Cambridge University Press:  24 October 2008

D. Bshouty ,
W. Hengartner  and
O. Hossian
D. Bshouty
Affiliation:
Technion, Haifa, Israel
W. Hengartner
Affiliation:
Université Laval, Québec, Canada
O. Hossian
Affiliation:
Université Laval, Québec, Canada
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Abstract

We give an example of a univalent orientation-preserving harmonic mapping f = h + defined on the unit disc U which is real on the real axis, satisfies and is not typically real. Furthermore, we give a geometric characterization for univalent, harmonic and typically real mappings.

Type
Research Article
Information
Mathematical Proceedings of the Cambridge Philosophical Society , Volume 119 , Issue 4 , May 1996 , pp. 673 - 680
Copyright
Copyright © Cambridge Philosophical Society 1996

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References

REFERENCES

[1]Bers, L.. Theory of pseudo-analytic functions. Lecture notes (mimeographed) (New York University, 1953).Google Scholar
[2]Boyarski, B. V.. Generalized solutions of a system of differential equations of first order and elliptic type with discontinuous coefficients. Mat. Sb. N.S. 43 (85) (1957), 451503 (Russian).Google Scholar
[3]Bshouty, D., Hengartner, N. and Hengartner, W.. A constructive method for starlike harmonic mappings. Numerische Mathematik 54 (1988), 167178.CrossRefGoogle Scholar
[4]Bshouty, D. and Hengartner, W.. Univalent solutions of the Dirichlet problem for ring domains. Complex Variables 21 (1993), 159169.Google Scholar
[5]Carleman, T.. Sur les systèmes linéaires aux dérivées partielles du premier ordre à deux variables. C.R. Acad. Sci. Paris 197 (1933), 471474.Google Scholar
[6]Clunie, J. G. and Sheil-Small, T. B.. Harmonic univalent functions. Ann. Acad. Sci. Fenn. Ser. AI9 (1984), 325.Google Scholar
[7]Gergen, J. J. and Dressel, F. G.. Mapping by p–regular functions. Duke Math. J. 18 (1951), 185210.CrossRefGoogle Scholar
[8]Gergen, J. J. and Dressel, F. G.. Uniqueness for p–regular mapping. Duke Math. J. 19 (1952), 435444.CrossRefGoogle Scholar
[9]Hengartner, W. and Schober, G.. Harmonic mappings with given dilatation. J. London Math. Soc. (2) 33 (1986), 473483.CrossRefGoogle Scholar