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We study the boundary value problems for harmonic functions on open connected subsets of post-critically finite (p. c. f. ) self-similar sets, on which the Laplacian is defined through a strongly recurrent self-similar local regular Dirichlet form. For a p. c. f. self-similar set K, we prove that for any open connected subset K whose "geometric" boundary is a graph-directed self-similar set, there exists a finite number of matrices called flux transfer matrices whose products generate the hitting probability from a point in to the "resistance" boundary. The harmonic functions on can be expressed by integrating functions on against the probability measures. Furthermore, we obtain a two-sided estimate of the energy of a harmonic function in terms of its values on.
Gu et al. (Tue,) studied this question.
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