p-energies on p.c.f. self-similar sets

Abstract

We study p-energies on post critically finite (p.c.f.) self-similar sets for 1<p<∞, as limits of discrete p-energies on approximation graphs, extending the construction of Dirichlet forms, the p=2 setting. By suitably enlarging the choices of discrete p-energies, and employing the energy averaging method developed by Kusuoka-Zhou, we prove the existence of symmetric p-energies on affine nested fractals, and extend Sabot's celebrated criterion for existence and non-existence of Dirichlet forms on p.c.f. self-similar sets to the 1<p<∞ setting.

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