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 タイトル: On L$^1$-Stability of Stationary Navier-Stokes Flows in $\Bbb R^n$ 著者: Miyakawa, Tetsuro 発行日: 1997年 出版者: Graduate School of Mathematical Sciences, The University of Tokyo 掲載誌情報: Journal of Mathematical Sciences, The University of Tokyo. Vol. 4 (1997), No. 1, Page 67-119 抄録: Stability of stationary Navier-Stokes flows in $\mbox{\tenopenface R}^n$, $n\geq 3$, is discussed in the function space ${\bm L}^1$ or ${\bm H}^1$ (Hardy space). It is shown that a stationary flow ${\bm w}$ is stable in ${\bm H}^1$\ (resp.\ ${\bm L}^1$)\ if $\sup|x|\cdot|{\bm w}(x)|+\sup|x|^2|\nabla{\bm w}(x)|$ (resp.\ $\|{\bm w}\|_{(n,1)}+\|\nabla{\bm w}\|_{(n/2,1)}$) is small. Explicit decay rates of the form $O(t^{-β/2})$, $0<β\leq 1$, are deduced for perturbations under additional assumptions on ${\bm w}$ and on initial data. The proofs of the results heavily rely on the theory of Hardy spaces ${\bm H}^p$\ \$(0 URI: http://hdl.handle.net/2261/1374 ISSN: 13405705 出現カテゴリ: Journal of Mathematical Sciences, the University of TokyoJournal of Mathematical Sciences, the University of Tokyo

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