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Геометрия и топология
On the unique determination of domains by the condition of the local isometry of the boundaries in the relative metrics. II
A. P. Kopylovab a Sobolev Institute of Mathematics,
pr. Koptyuga, 4,
630090, Novosibirsk, Russia
b Novosibirsk State University,
ul. Pirogova, 2
630090, Novosibirsk, Russia
Аннотация:
We prove the theorem on the unique
determination of a strictly convex domain in $\mathbb R^n$, where $n
\ge 2$, in the class of all $n$-dimensional domains by the condition
of the local isometry of the Hausdorff boundaries in the relative
metrics, which is a generalization of A. D. Aleksandrov's
theorem on the unique determination of a strictly convex domain by
the condition of the (global) isometry of the boundaries in the
relative metrics.
We also prove that, in the cases of a plane domain $U$ with
nonsmooth boundary and of a three-dimensional domain $A$ with smooth
boundary, the convexity of the domain is no longer necessary for its
unique determination by the condition of the local isometry of
the boundaries in the relative metrics.
Ключевые слова:
intrinsic metric, relative metric of the boundary, local isometry of the boundaries, strict convexity.
Поступила 28 декабря 2016 г., опубликована 29 сентября 2017 г.
Образец цитирования:
A. P. Kopylov, “On the unique determination of domains by the condition of the local isometry of the boundaries in the relative metrics. II”, Сиб. электрон. матем. изв., 14 (2017), 986–993
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/semr840 https://www.mathnet.ru/rus/semr/v14/p986
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