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Conjugate Cauchy Problem for Parabolic Shilov Type Systems with Nonnegative Genus

Conjugate Cauchy Problem for Parabolic Shilov Type Systems with Nonnegative Genus The problem of solvability of the Gelfand–Shilov conjugate Cauchy problem for parabolic Shilov type systems with variable coefficients of bounded smoothness and nonnegative genus in the spaces S β is studied by constructing the fundamental solution of this problem and analyzing its basic properties. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Differential Equations Springer Journals

Conjugate Cauchy Problem for Parabolic Shilov Type Systems with Nonnegative Genus

Litovchenko, V.; Unguryan, G.
Differential Equations , Volume 54 (3) – May 3, 2018
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References (13)

Publisher
Springer Journals
Copyright
Copyright © 2018 by Pleiades Publishing, Ltd.
Subject
Mathematics; Ordinary Differential Equations; Partial Differential Equations; Difference and Functional Equations
ISSN
0012-2661
eISSN
1608-3083
DOI
10.1134/S0012266118030060
Publisher site
See Article on Publisher Site

Abstract

The problem of solvability of the Gelfand–Shilov conjugate Cauchy problem for parabolic Shilov type systems with variable coefficients of bounded smoothness and nonnegative genus in the spaces S β is studied by constructing the fundamental solution of this problem and analyzing its basic properties.

Journal

Differential EquationsSpringer Journals

Published: May 3, 2018

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