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Boundary Conditions and Subelliptic Estimates for Geometric Kramers-Fokker-Planck Operators on Manifolds with Boundaries 142 p.
Nier, Francis
著
発行年月 |
2018年04月 |
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出版国 |
アメリカ合衆国 |
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言語 |
英語 |
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媒体 |
冊子 |
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装丁 |
paper |
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ページ数/巻数 |
142 p. |
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ジャンル |
洋書 |
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ISBN |
9781470428020 |
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商品コード |
1026672562 |
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本の性格 |
学術書 |
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新刊案内掲載月 |
2018年02月 |
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商品URL
| https://kw.maruzen.co.jp/ims/itemDetail.html?itmCd=1026672562 |
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内容
This article is concerned with the maximal accretive realizations of geometric Kramers-Fokker-Planck operators on manifolds with boundaries. A general class of boundary conditions is introduced which ensures the maximal accretivity and some global subelliptic estimates. Those estimates imply nice spectral properties as well as exponential decay properties for the associated semigroup. Admissible boundary conditions cover a wide range of applications for the usual scalar Kramer-Fokker-Planck equation or Bismut's hypoelliptic laplacian.