BGD domains in p.c.f. self-similar sets II: spectral asymptotics for Laplacians

Abstract

Let K be a p.c.f. self-similar set equipped with a strongly recurrent Dirichlet form. Under a homogeneity assumption, for an open set ⊂ K whose boundary ∂ is a graph-directed self-similar set, we prove that the eigenvalue counting function (x) of the Laplacian with Dirichlet or Neumann boundary conditions (Neumann only for connected ) has an explicit second term as x +∞, beyond the dominant Weyl term. If ∂ has a strong iterated structure, we establish that equation* (x)=()G( x2)xdS2+(∂)G1( x2)x d2+o(x d2), equation* where G and G1 are bounded periodic functions, and are certain reference measures, and dS and d are dimension-related parameters.