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Asymptotic properties of unbounded quadrature domains the plane

Published online by Cambridge University Press:  07 January 2015

LAVI KARP*
Affiliation:
Department of Mathematics, ORT Braude College, P.O. Box 78, 21982 Karmiel, Israel email: [email protected]

Abstract

We prove that if Ω is a simply connected quadrature domain (QD) of a distribution with compact support and the point of infinity belongs to the boundary, then the boundary has an asymptotic curve that is a straight line, parabola or infinite ray. In other words, such QDs in the plane are perturbations of null QDs.

Type
Papers
Copyright
Copyright © Cambridge University Press 2015 

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References

[1]Aharonov, D. & Shapiro, H. S. (1976) Domains on which analytic functions satisfy quadrature identities. J. Anal. Math. 30, 3973.Google Scholar
[2]Bers, L. (1965) An approximation theorem. J. Anal. Math. 14, 14.Google Scholar
[3]Davis, P. (1974) The Schwarz Function and Its Application, Carus Mathematical Monographs, Vol. 14, The Mathematical Association of America, Washington DC, USA.CrossRefGoogle Scholar
[4]Fedorova, N. V. & Tsirulskiy, A. V. (1976) The solvability in finite form of the inverse logarithmic potential problem for contact surface. Phys. Solid Earth 12, 660665 (translated from Russian).Google Scholar
[5]Gardiner, S. J. & Sjödin, T. (2008) Convexity and the exterior inverse problem of potential theory. Proc. Am. Math. Soc. 136 (5), 16991703.Google Scholar
[6]Gustafsson, B. (1983) Quadrature identities and the Schottky double. Acta Appl. Math. 1, 209240.Google Scholar
[7]Gustafsson, B. (1990) On quadrature domains and on an inverse problem in potential theory. J. Anal. Math. 44, 172215.CrossRefGoogle Scholar
[8]Hayman, W. K., Karp, L. & Shapiro, H. S. (2000) Newtonian capacity and quasi balayage. Rend. Mat. Appl. 20 (7), 93129.Google Scholar
[9]Isakov, V. (1993) Inverse Source Problems, Surveys and Monographs, Vol. 34, American Mathematical Society, Providence, RI.Google Scholar
[10]Ivanov, V. K. (1956) On the solvability of the inverse problem of the logarithmic potential in finite terms. Dokl. SSSR Acad. Sci. Math. 104 (4), 598599 (in Russian).Google Scholar
[11]Karp, L. & Margulis, A. S. (1996) Newtonian potential theory for unbounded sources and applications to free boundary problems. J. Anal. Math. 70, 163.Google Scholar
[12]Karp, L. & Shahgholian, H. (2000) Regularity of a free boundary problem near the infinity point. Commun. Partial Differ. Equ. 25 (11–12), 20552086.Google Scholar
[13]Lee, S. Y. & Makarov, N. G. (2013) Topology of quadrature domains, arXiv:1307.0487 [math.CV].Google Scholar
[14]Margulis, A. S. (1995) The moving boundary problem of potential theory. Adv. Math. Sci. Appl. 5 (2), 603629.Google Scholar
[15]Novikov, P. S. (1938) On the inverse problem of potential. Dokl. Akad. Nauk SSSR 18, 165168 (translated from Russian).Google Scholar
[16]Sakai, M. (1981) Null quadrature domains. J. Anal. Math. 40, 144154.Google Scholar
[17]Sakai, M. (1982) Quadrature Domains, Lecture Notes in Mathematics, Vol. 934, Springer-Verlag, Berlin–Heidelberg–New York.Google Scholar
[18]Sakai, M. (1991) Regularity of a boundary having a schwarz function. Acta Math. 166, 263297.CrossRefGoogle Scholar
[19]Sakai, M. (1993) Regularity of boundaries of quadrature domains in two dimensions. SIAM J. Math. Anal. 24, 341364.Google Scholar
[20]Sakai, M. (2009) Quadrature domains with infinite volume. Complex Anal. Operator Theory 3 (2), 525549.Google Scholar
[21]Shapiro, H. S. (1987) Unbounded quadrature domains. In: Berenstein, C. (editor), Complex Analysis I, Lecture Notes in Mathematics, Vol. 1275, Springer-Verlag, 1987, pp. 287331.Google Scholar
[22]Shapiro, H. S. (1992) The Schwarz Function and Its Generalization to Higher Dimensions, Arkansas Lecture Notes in the Mathematical Sciences, Vol. 9, John Wily & Sons Inc., New York.Google Scholar
[23]Strakhov, V. N. (1974a) The inverse logarithmic potential problem for contact surface. Phys. Solid Earth 10, 104114, (translated from Russian).Google Scholar
[24]Strakhov, V. N. (1974b) The inverse problem of the logarithmic potential for contact surface. Phys. Solid Earth 10, 369379 (translated from Russian).Google Scholar
[25]Tsirulskiy, A. V. (1963) Some properties of the complex logarithmic potential of a homogeneous region. Bull. (Izv.) Acad. Sci. USSR Geophys. Ser. 7, 653655, (Russian).Google Scholar
[26]Zalcman, L. (1987) Some inverse problems of potential theory. Integral Geometry, Contemp. Math., Vol. 63, American Mathematical Society, Providence, RI, pp. 337350.CrossRefGoogle Scholar