Flux in axiomatic potential theory. II. Duality

Walsh, Bertram

Walsh, Bertram

Annales de l'Institut Fourier, Tome 19 (1969), p. 371-417 / Harvested from Numdam

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Abstract

Cet article est la suite d’une publication antérieure [Inventiones Math., 8 (1969), 175-221]. On développe, à partir d’un espace $W$ et d’un faisceau $H$ défini là-dessus, satisfaisant aux axiomes de Brelot et, localement, aux hypothèses de la théorie des faisceaux adjoints, les sujets suivants : 1) l’extension de la théorie des faisceaux adjoints au cas où $(W, H)$ n’admet pas de potentiel global (cas particulier : $W$ compact). 2) La construction d’une nouvelle résolution fine $O \to H \to R \to L \to O$ de $H$ , $L$ étant un faisceau naturel de mesures sur $W$ . 3) La construction d’une dualité naturelle entre $Γ (W, H^{*})$ et $H_{K}^{1} (W, H)$ ( $K =$ supports compacts), faisant correspondre le flux à un élément positif distingué de $H_{W}^{*}$ .

This is a continuation of an earlier paper [Inventiones Math., 8 (1969), 175-221]. It is assumed that a space $W$ and a sheaf $H$ over $W$ are given, such that the pair $(W, H)$ satisfies the Brelot axioms and also satisfies, locally, the additional hypotheses of the theory of adjoint sheaves. The following subjects are considered: 1) Extension of the adjoint-sheaf theory to the case where $(W, H)$ does not admit a global potential (in particular, the case where $W$ is compact). 2) Construction of a new fine resolution $O \to H \to R \to L \to O$ of the sheaf $H$ , in which $L$ is a (complete pre-)sheaf of measures on $W$ . 3) Construction of a natural duality between the flux functional corresponds to a distinguished positive element of $H_{W}^{*}$ .

Publié le : 1969-01-01

MR 42 #2023 | Zbl 0181.11703 | 1 citation dans Numdam

DOI : https://doi.org/10.5802/aif.331

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     author = {Walsh, Bertram},
     title = {Flux in axiomatic potential theory. II. Duality},
     journal = {Annales de l'Institut Fourier},
     volume = {19},
     year = {1969},
     pages = {371-417},
     doi = {10.5802/aif.331},
     mrnumber = {42 \#2023},
     zbl = {0181.11703},
     language = {en},
     url = {http://dml.mathdoc.fr/item/AIF_1969__19_2_371_0}
}

Walsh, Bertram. Flux in axiomatic potential theory. II. Duality. Annales de l'Institut Fourier, Tome 19 (1969) pp. 371-417. doi : 10.5802/aif.331. http://gdmltest.u-ga.fr/item/AIF_1969__19_2_371_0/

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