On Boundary Points at Which the Squeezing Function Tends to One
暂无分享,去创建一个
[1] Andrew M. Zimmer. Characterizing strong pseudoconvexity, obstructions to biholomorphisms, and Lyapunov exponents , 2017, Mathematische Annalen.
[2] E. F. Wold,et al. A non-strictly pseudoconvex domain for which the squeezing function tends to 1 towards the boundary , 2016, Pacific Journal of Mathematics.
[3] Andrew M. Zimmer. A gap theorem for the complex geometry of convex domains , 2016, Transactions of the American Mathematical Society.
[4] Seungro Joo. On the scaling methods by Pinchuk and Frankel , 2016, 1607.06580.
[5] Kang-Tae Kim,et al. On the uniform squeezing property and the squeezing function , 2013, 1306.2390.
[6] K. Diederich,et al. Exposing Points on the Boundary of a Strictly Pseudoconvex or a Locally Convexifiable Domain of Finite 1-Type , 2013, 1303.1976.
[7] Liyou Zhang,et al. PROPERTIES OF SQUEEZING FUNCTIONS AND GLOBAL TRANSFORMATIONS OF BOUNDED DOMAINS , 2013, 1302.5307.
[8] R. Greene,et al. The Geometry of Complex Domains , 2011 .
[9] Sai-Kee Yeung. Geometry of domains with the uniform squeezing property , 2009, 0906.4647.
[10] S. Yau,et al. Canonical Metrics on the Moduli Space of Riemann Surfaces II , 2004, math/0409220.
[11] S. Krantz,et al. Complex scaling and domains with non-compact automorphism group , 2001 .
[12] S. Pinchuk,et al. Domains in Cn+1 with noncompact automorphism group , 1991 .
[13] D. Catlin. Estimates of invariant metrics on pseudoconvex domains of dimension two , 1989 .
[14] S. Yau,et al. Complete affine hypersurfaces. Part I. The completeness of affine metrics , 1986 .
[15] J. D'Angelo. Real hypersurfaces, orders of contact, and applications , 1982 .
[16] N. Sibony. A CLASS OF HYPERBOLIC MANIFOLDS , 1981 .
[17] J. Fornæss,et al. A Construction of Peak Functions on Weakly Pseudoconvex Domains , 1978 .
[18] K. Diederich,et al. Pseudoconvex domains: Bounded strictly plurisubharmonic exhaustion functions , 1977 .
[19] A. Huckleberry. Holomorphic fibrations of bounded domains , 1977 .