Existence and uniqueness of C0-semigroup in L∞: a new topological approach

Wu, Liming; Zhang, Yiping

doi:10.1016/S1631-073X(02)02245-8

Existence and uniqueness of C₀-semigroup in L^∞: a new topological approach
[Existence et unicité de C₀-semigroupe sur L^∞]

Wu, Liming ^1,² ; Zhang, Yiping ²

¹ Department of Mathematics, Wuhan University, 430072 Hubei, China
² Laboratoire de mathématiques appliquées, Université Blaise Pascal, 63177 Aubière, France

Comptes Rendus. Mathématique, Tome 334 (2002) no. 8, pp. 699-704.

Résumé
Abstract

Un semigroupe sous-Markovien sur L^∞ n'est pas, en général, fortement continu par rapport à la topologie de norme. Nons allons introduire une nouvelle topologie sur L^∞ par rapport à laquelle les semigroupes sous-Markoviens dans la litterature deviennent C₀-semigroupes. Ce sera réalisé par une extension naturelle du théorème de Phillips pour semigroupe dual. Un théorème de Hille–Yosida simplifié est fourni. Cette nouvelle topologie nous permet d'introduire la notion d'unicité dans L^∞ d'un prégénérateur. Nous présentons plusieurs important opérateurs dont l'unicité dans L^∞ est établie.

A sub-Markov semigroup in L^∞ is in general not strongly continuous with respect to the norm topology. We introduce a new topology on L^∞ for which the usual sub-Markov semigroups in the literature become C₀-semigroups. This is realized by a natural extension of the Phillips theorem about dual semigroup. A simplified Hille–Yosida theorem is furnished. Moreover this new topological approach will allow us to introduce the notion of L^∞-uniqueness of pre-generator. We present several important pre-generators for which we can prove their L^∞-uniqueness.

Reçu le : 2001-10-07
Accepté le : 2001-12-14
Publié le : 2002-01-01

DOI : 10.1016/S1631-073X(02)02245-8

Affiliations des auteurs :

Wu, Liming ^{1, 2} ; Zhang, Yiping ²

¹ Department of Mathematics, Wuhan University, 430072 Hubei, China
² Laboratoire de mathématiques appliquées, Université Blaise Pascal, 63177 Aubière, France

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     author = {Wu, Liming and Zhang, Yiping},
     title = {Existence and uniqueness of {\protect\emph{C}\protect\textsubscript{0}-semigroup} in {L\protect\textsuperscript{\ensuremath{\infty}}:} a new topological approach},
     journal = {Comptes Rendus. Math\'ematique},
     pages = {699--704},
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     number = {8},
     year = {2002},
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     language = {en},
     url = {http://www.numdam.org/articles/10.1016/S1631-073X(02)02245-8/}
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Wu, Liming; Zhang, Yiping. Existence and uniqueness of C₀-semigroup in L^∞: a new topological approach. Comptes Rendus. Mathématique, Tome 334 (2002) no. 8, pp. 699-704. doi : 10.1016/S1631-073X(02)02245-8. http://www.numdam.org/articles/10.1016/S1631-073X(02)02245-8/

Bibliographie
Cité par

[1] Arendt, W. The abstract Cauchy problem, special semigroups and perturbation (Nagel, R., ed.), One Parameter Semigroups of Positive Operators, Lecture Notes in Math., 1184, Springer, Berlin, 1986

[2] Cerrai, S. A Hille–Yosida theorem for weakly continuous semigroups, Semigroup Forum, Volume 49 (1994), pp. 349-367

[3] H. Djellout, Unicité dans L^p d'opérateurs de Nelson, Preprint, 1997

[4] Dynkin, E.B. Markov Processes, Vol. I, II, Grundlehren der mathematischen Wissenschaften 121 and 122, Springer-Verlag, 1965

[5] A. Eberle, Uniqueness and non-uniqueness of singular diffusion operators. Ph.D dissertation, Bielefeld, 1997

[6] Ethier, S.N.; Kurtz, T.S. Markov Processes: Characterization and Convergence, Wiley, 1986

[7] Feller, W. The parabolic differential equations and the associated semigroups of transformations, Ann. Math., Volume 55 (1952) no. 3, pp. 468-519

[8] Feller, W. Semi-groups of transformations in general weak topologies, Ann. Math., Volume 57 (1953), pp. 287-308

[9] Jefferies, B. Weakly integrable semigroups on locally convex spaces, J. Funct. Anal., Volume 66 (1986), pp. 347-364

[10] Jefferies, B. The generation of weakly integrable semigroups, J. Funct. Anal., Volume 66 (1987), pp. 347-364

[11] Pazy, A. Semigroups of Linear Operators and Applications to Partial Differential Equations, Appl. Math. Sci., 44, Springer-Verlag, 1983

[12] Wu, L.M. Uniqueness of Schödinger operateurs restricted to a domain, J. Funct. Anal., Volume 153 (1998), pp. 276-319

[13] Wu, L.M. Uniqueness of Nelson's diffusions, Probab. Theory Related Fields, Volume 114 (1999), pp. 549-585

[14] Yosida, K. Functional Analysis, Third Version, Grundlehren der mathematischen Wissenschaften, 123, Springer-Verlag, 1971

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