Once more about cauchy problem for evolution equation

Once more about cauchy problem for evolution equation

The Cauchy problem for linear evolution equations and systems of equation of the arbitrary order have been a subject of a practically infinite number of papers. They contain important different information as about the uniqness and vell-posedness of Cauchy problem for equations of different structur...

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Published in:Нелинейные граничные задачи
Date:2000
Main Authors: Eidelman, S.D., Kamin, S., Porper, F.O.
Format: Article
Language:English
Published: Інститут прикладної математики і механіки НАН України 2000
Online Access:https://nasplib.isofts.kiev.ua/handle/123456789/169241
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Journal Title:Digital Library of Periodicals of National Academy of Sciences of Ukraine
Cite this:Once more about cauchy problem for evolution equation / S.D. Eidelman, S. Kamin, F.O. Porper // Нелинейные граничные задачи: сб. науч. тр. — 2000. — Т. 10. — С. 75-82. — Бібліогр.: 12 назв. — англ.

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Digital Library of Periodicals of National Academy of Sciences of Ukraine
id nasplib_isofts_kiev_ua-123456789-169241
record_format dspace
spelling Eidelman, S.D.
Kamin, S.
Porper, F.O.
2020-06-09T10:43:21Z
2020-06-09T10:43:21Z
2000
Once more about cauchy problem for evolution equation / S.D. Eidelman, S. Kamin, F.O. Porper // Нелинейные граничные задачи: сб. науч. тр. — 2000. — Т. 10. — С. 75-82. — Бібліогр.: 12 назв. — англ.
0236-0497
https://nasplib.isofts.kiev.ua/handle/123456789/169241
The Cauchy problem for linear evolution equations and systems of equation of the arbitrary order have been a subject of a practically infinite number of papers. They contain important different information as about the uniqness and vell-posedness of Cauchy problem for equations of different structure and type as about gualitative properties of the solutions of this problem. The talk mainly concentrates on the discussion of certain concrete questions about this exstensive now sufficiently traditional, but still attractive region of investigation.
en
Інститут прикладної математики і механіки НАН України
Нелинейные граничные задачи
Once more about cauchy problem for evolution equation
Article
published earlier
institution Digital Library of Periodicals of National Academy of Sciences of Ukraine
collection DSpace DC
title Once more about cauchy problem for evolution equation
spellingShingle Once more about cauchy problem for evolution equation
Eidelman, S.D.
Kamin, S.
Porper, F.O.
title_short Once more about cauchy problem for evolution equation
title_full Once more about cauchy problem for evolution equation
title_fullStr Once more about cauchy problem for evolution equation
title_full_unstemmed Once more about cauchy problem for evolution equation
title_sort once more about cauchy problem for evolution equation
author Eidelman, S.D.
Kamin, S.
Porper, F.O.
author_facet Eidelman, S.D.
Kamin, S.
Porper, F.O.
publishDate 2000
language English
container_title Нелинейные граничные задачи
publisher Інститут прикладної математики і механіки НАН України
format Article
description The Cauchy problem for linear evolution equations and systems of equation of the arbitrary order have been a subject of a practically infinite number of papers. They contain important different information as about the uniqness and vell-posedness of Cauchy problem for equations of different structure and type as about gualitative properties of the solutions of this problem. The talk mainly concentrates on the discussion of certain concrete questions about this exstensive now sufficiently traditional, but still attractive region of investigation.
issn 0236-0497
url https://nasplib.isofts.kiev.ua/handle/123456789/169241
fulltext
citation_txt Once more about cauchy problem for evolution equation / S.D. Eidelman, S. Kamin, F.O. Porper // Нелинейные граничные задачи: сб. науч. тр. — 2000. — Т. 10. — С. 75-82. — Бібліогр.: 12 назв. — англ.
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AT kamins oncemoreaboutcauchyproblemforevolutionequation
AT porperfo oncemoreaboutcauchyproblemforevolutionequation
first_indexed 2025-11-25T20:37:26Z
last_indexed 2025-11-25T20:37:26Z
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