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Connexion en topologie fine et balayage des mesures. (Connection on fine topology and balayage of measures.). (French) Zbl 0208.13802


MSC:

31C40 Fine potential theory; fine properties of sets and functions
31D05 Axiomatic potential theory
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References:

[1] [1] , Points irréguliers et transformations continues en théorie du potentiel, J. de Math. (Liouville), (1940), 319-337. · JFM 66.0447.01
[2] [2] , Quelques propriétés et applications du balayage, C.R. Acad. Sci. (Paris), 227, (1948), 19-21. · Zbl 0038.26203
[3] [3] , Lectures on potential theory. Tata Institute of Fundamental Research. Bombay (1960). · Zbl 0098.06903
[4] [4] , Axiomatique des fonctions harmoniques. Montréal (1966). · Zbl 0148.10401
[5] [5] et , Espaces et lignes de Green. Ann. Inst. Fourier, 3, (1951), 199-263. · Zbl 0046.32701
[6] [3] , Partial differential equations, Wiley, New York, (1964), 672 p. · Zbl 0141.30501
[7] [7] , Some properties of the balayage of measures on a harmonic space, Ann. Inst. Fourier, 17, (1967), 273-293. · Zbl 0159.40804
[8] [8] , Sur les fonctions dérivées sommables, Bull. Soc. Math. France, 43, (1916), 161-248. · JFM 45.1286.01
[9] [9] , Applications to analysis of a topological definition of smallness of a set, Bull. Amer. Math. Soc., 72, (1966), 579-600. · Zbl 0142.09001
[10] [10] , Propriétés de connexion en topologie fine. Prépublication. Copenhague (1969).
[11] [24] , C.R. Acad. Sci. de l’URSS, 81 (1951), no 2, p. 149 ; Notes scientifiques de l’Université de Kazan, 114, (1954 · Zbl 0223.31016
[12] [12] , Recherches axiomatiques sur la théorie des fonctions surharmoniques et du potentiel, Ann. Inst. Fourier, 12, (1962), 415-571. · Zbl 0101.08103
[13] [13] and , A characterization of fine domains for a certain class of Markov processes with applications to Brelot harmonic spaces. (To appear). · Zbl 0213.20101
[14] [14] , Über approximativ stetigen Funktionen. Fund. Math., 13, (1929), 201-209. · JFM 55.0145.01
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