Martin boundary of a fine domain and a Fatou-Naim-Doob theorem for finely superharmonic functions
Abstract
We construct the Martin compactification U of a fine domain U in Rn, n 2, and the Riesz-Martin kernel K on U × U. We obtain the integral representation of finely superharmonic fonctions 0 on U in terms of K and establish the Fatou-Naim-Doob theorem in this setting.
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