Weierstrass’s Global Division Theorem and Continuity of Linear Operators in H-spaces

Smirnov, Eugeny (2019) Weierstrass’s Global Division Theorem and Continuity of Linear Operators in H-spaces. In: Advances in Mathematics and Computer Science Vol. 2. B P International, pp. 1-22. ISBN 978-93-89562-01-9

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Abstract

We introduce here new concepts of functional analysis: Hausdorff spectrum and Hausdorff limit or H-limit of
Hausdorff spectrum of locally convex spaces. Author has introduced this concepts in 2002 but progress in
different areas of mathematics (algebraic geometry, differential equations, category theory, ets) defined the need
to expand fundamental concepts. Particular cases of regular H-limit are projective and inductive limits of
separated locally convex spaces. The class of H-spaces contains Fréchet spaces and is stable under the
operations of forming countable inductive and projective limits, closed subspaces and factor-spaces. Besides, for
H-space the strengthened variant of the closed graph theorem holds true. In the present article generalization of
Weierstrass’s preparation theorem and the division theorem for germs of holomorphic functions at a point of ndimensional
complex space are considered. The author formulates the global theorem about division in terms of
existence and continuity of the linear operator.

Item Type: Book Section
Subjects: Research Asian Plos > Computer Science
Depositing User: Unnamed user with email support@research.asianplos.com
Date Deposited: 20 Nov 2023 05:13
Last Modified: 17 Oct 2024 05:13
URI: http://abstract.stmdigitallibrary.com/id/eprint/2120

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