Аннотация:
A ring domain (annulus) in the complex plane contains
a round (genuine) subring of the form $r_1<|z-a|<r_2$
if the ring domain has a large enough modulus $m.$
Moreover, the subring can be taken so that $\log(r_2/r_1)
\ge m-C,$ where $C$ is an absolute constant.
This sort of result was first proved by Teichmüller.
In [1], we introduced a notion of semi-annulus and its modulus
and applied it to study boundary continuity of homeomorphisms
of a disk or a half-plane.
In the present talk, we extend these result into the $n$-dimensional
case. Indeed, we have similar results for rings
and semi-rings in $\mathbb{R}^n.$
This is joint work with Anatoly Golberg.
Язык доклада: английский
Список литературы
Vladimir Gutlyanskiĭ, Ken-ichi Sakan, Toshiyuki Sugawa, “On $\mu$-conformal homeomorphisms and boundary correspondence”, Complex Var. Elliptic Equ., 58:7 (2013), 947–962