Evolution inclusions governed by subdifferentials in reflexive Banach spaces |
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| Authors: | Goro?Akagi mailto:goro@toki.waseda.jp" title=" goro@toki.waseda.jp" itemprop=" email" data-track=" click" data-track-action=" Email author" data-track-label=" " >Email author,Mitsuharu??tani |
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| Affiliation: | (1) Department of Applied Physics, School of Science and Engineering, Waseda University, 4-1, Okubo 3-chome, Shinjuku-ku, Tokyo 169-8555, Japan |
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| Abstract: | ![]()
The existence, uniqueness and regularity of strong solutions for Cauchy problem and periodic problem are studied for the evolution equation:![$$du(t)/dt + partial varphi (u(t)) mathrelbackepsilon f(t),,t in
]0,,T[,$$](/content/581y2m8hckfelwub/28_2004_162_IEq1.gif) where   is the so-called subdifferential operator from a real Banach space V into its dual V*. The study in the Hilbert space setting (V = V* = H: Hilbert space) is already developed in detail so far. However, the study here is done in the V–V* setting which is not yet fully pursued. Our method of proof relies on approximation arguments in a Hilbert space H. To assure this procedure, it is assumed that the embeddings are both dense and continuous. |
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| Keywords: | 34G25 35K55 35K65 |
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