|
This article is cited in 52 scientific papers (total in 53 papers)
Regularity of the boundaries of analytic sets
E. M. Chirka
Abstract:
In this article the author studies the boundary behavior of a one-dimensional complex analytic set $A$ in a neighborhood of a totally real manifold $M$ in $\mathbf C^n$ with smoothness greater than 1. He proves that the limit points of $A$ on $M$ form a set of locally finite length and that near almost every limit point the closure of $A$ is either a manifold with boundary (with smoothness corresponding to $M$) or a union of two manifolds with boundary. He investigates the structure of the tangent cone to $A$ at the limit points and proves a theorem concerning the boundary regularity of holomorphic discs “glued” to $M$.
Bibliography: 22 titles.
Received: 01.10.1981
Citation:
E. M. Chirka, “Regularity of the boundaries of analytic sets”, Math. USSR-Sb., 45:3 (1983), 291–335
Linking options:
https://www.mathnet.ru/eng/sm2211https://doi.org/10.1070/SM1983v045n03ABEH001010 https://www.mathnet.ru/eng/sm/v159/i3/p291
|
|