On singularity of energy measures for symmetric diffusions with full off-diagonal heat kernel estimates II: Some borderline examples

Abstract

We present a concrete family of fractals, which we call the (two-dimensional) thin scale irregular Sierpi\'nski gaskets and each of which is equipped with a canonical strongly local regular symmetric Dirichlet form. We prove that any fractal K in this family satisfies the full off-diagonal heat kernel estimates with some space-time scale function K and the singularity of the associated energy measures with respect to the canonical volume measure (uniform distribution) on K, and also that the decay rate of r-2K(r) to 0 as r 0 can be made arbitrarily slow by suitable choices of K. These results together support the energy measure singularity dichotomy conjecture [Ann. Probab. 48 (2020), no. 6, 2920--2951, Conjecture 2.15] stating that, if the full off-diagonal heat kernel estimates with space-time scale function satisfying r 0r-2(r)=0 hold for a strongly local regular symmetric Dirichlet space with complete metric, then the associated energy measures are singular with respect to the reference measure of the Dirichlet space.