Titlebook: Classical Potential Theory and Its Probabilistic Counterpart; Joseph L. Doob Book 2001 Springer-Verlag Berlin Heidelberg 2001 31XX.Brownia

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The Dirichlet Problem for Relative Harmonic Functionsclosure in ., if .. is the class of all such balls, and if μ.(ξ, .) is the unweighted average of . on ?., then the class of continuous functions on . satisfying (1.1) is the class of harmonic functions on .. Going back to the general case, suppose that . is a strictly positive generalized harmonic function and define μ..(ξ, ·) by

condone

Book 2001liminary knowledge. ...The purpose which the author explains in his introduction, i.e. a deep probabilistic interpretation of potential theory and a link between two great theories, appears fulfilled in a masterly manner"..M. Brelot in Metrika (1986)

多余

Book 2001not very easy to read) of this bothsided question that replaces, in a coherent way, without being encyclopaedic, a large library of books and papers scattered without a uniform language. Instead of summarizing the author gives his own way of exposition with original complements. This requires no pre

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砍伐

Heidi Kelley,Kenneth A. Betsalelclosure in ., if .. is the class of all such balls, and if μ.(ξ, .) is the unweighted average of . on ?., then the class of continuous functions on . satisfying (1.1) is the class of harmonic functions on .. Going back to the general case, suppose that . is a strictly positive generalized harmonic function and define μ..(ξ, ·) by

flamboyant

1431-0821 appears as a precise and impressive study (not very easy to read) of this bothsided question that replaces, in a coherent way, without being encyclopaedic, a large library of books and papers scattered without a uniform language. Instead of summarizing the author gives his own way of exposition with

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acrophobia

Green Functionsists for every ξ in .. In fact .(ξ , ·)–.(ξ, ·) is bounded below outside each neighborhood of ξ, and .(ξ, ·) is bounded below on each compact neighborhood of ξ so that if GM..(ξ, ·) exists, .(ξ , ·) ≥ . + GM..(ξ, ·) GM..(ξ , ·) ≥ . + GM..(ξ, ·) for some constant . depending on ξand ξ.

Magisterial

Basic Properties of Harmonic, Subharmonic, and Superharmonic Functions = δ.. To simplify the notation take ξ. = .. Then .., as defined by.with the understanding that ..(ξ, ξ)= +∞, satisfies items (ix′)–(ivx′) of Section 1.8, so that harmonic measure for . is given by.where .. here refers to surface area on ?. and

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