Dirichlet forms on self-similar sets with overlaps

Abstract

We study Dirichlet forms and Laplacians on self-similar sets with overlaps. A notion of "finitely ramified of finite type(f.r.f.t.) nested structure" for self-similar sets is introduced. It allows us to reconstruct a class of self-similar sets in a graph-directed manner by a modified setup of Mauldin and Williams, which satisfies the property of finite ramification. This makes it possible to extend the technique developed by Kigami for analysis on p.c.f. self-similar sets to this more general framework. Some basic properties related to f.r.f.t. nested structures are investigated. Several non-trivial examples and their Dirichlet forms are provided.