On a recursive construction of Dirichlet form on the Sierpi\'nski gasket

Abstract

Let n denote the n-th level Sierpi\'nski graph of the Sierpi\'nski gasket K. We consider, for any given conductance (a0, b0, c0) on 0, the Dirchlet form E on K obtained from a recursive construction of compatible sequence of conductances (an, bn, cn) on n, n≥ 0. We prove that there is a dichotomy situation: either a0= b0 =c0 and E is the standard Dirichlet form, or a0 >b0 =c0 (or the two symmetric alternatives), and E is a non-self-similar Dirichlet form independent of a0, b0. The second situation has also been studied in [Hattori et al 1994][Hambley et al 2002] as a one-dimensional asymptotic diffusion process on the Sierpi\'nski gasket. For the spectral property, we give a sharp estimate of the eigenvalue distribution of the associated Laplacian, which improves a similar result in [Hambley et al 2002].