Covering of nonlinear maps on a cone in neighborhoods of irregular points

Inverse function theorems for smooth nonlinear maps defined on convex cones in Banach spaces in a neighborhood of an irregular point are considered. The corresponding covering theorem is proved. The proofs are based on a Banach open mapping theorem for convex cones in Banach spaces, which is also proved in the paper. Sufficient conditions for tangency to the zero set of a nonlinear map without a priori regularity assumptions are obtained. © 2005 Springer Science+Business Media, Inc.

Authors

Arutyunov A.V. ¹

Journal

Mathematical Notes

Number of issue

3-4

Language

English

Pages

447-460

Status

Published

Link

External link

DOI

10.1007/s11006-005-0043-x

Volume

Year

2005

Organizations

¹ Peoples' Friendship Univ. of Russia, Moscow, Russian Federation

Keywords

Γ-covering map; Banach open mapping theorem; Covering theorem for a cone; Implicit function theorem; Linearly covering map; Robinson regularity condition

Date of creation

19.10.2018

Date of change

19.10.2018

Short link

https://repository.rudn.ru/en/records/article/record/3508/

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Article

Fain V.Ya., Zaitsev B.E., Ryabov M.A.

Russian Journal of Coordination Chemistry/Koordinatsionnaya Khimiya. Vol. 31. 2005. P. 221-224

Covering of nonlinear maps on a cone in neighborhoods of irregular points

Other records

ALGEBRAIC SPLINES IN LOCALLY CONVEX SPACES

ELECTRONIC ABSORPTION SPECTRA AND THE STRUCTURE OF THE LIGAND IN METAL COMPLEXES WITH PURPURIN