Oscillating heat kernels on ultrametric spaces

Abstract

Let (X,d) be a proper ultrametric space. Given a measure m on X and a function B C(B) defined on the collection of all non-singleton balls B of X, we consider the associated hierarchical Laplacian L=LC\,. The operator L acts in L2(X,m), is essentially self-adjoint and has a pure point spectrum. It admits a continuous heat kernel p(t,x,y) with respect to m. We consider the case when X has a transitive group of isometries under which the operator L is invariant and study the asymptotic behaviour of the function t p(t,x,x)=p(t). It is completely monotone, but does not vary regularly. When X=Qp\,, the ring of p-adic numbers, and L=Dα , the operator of \ fractional derivative of order α, we show that p(t)=t-1/αA% (pt), where A(τ) is a continuous non-constant α-periodic function. We also study asymptotic behaviour of and as the space parameter p tends to ∞. When X=S∞\,, the infinite symmetric group, and L is a hierarchical Laplacian with metric structure analogous to Dα, we show that, contrary to the previous case, the completely monotone function p(t) oscillates between two functions (t) and (t) such that (t)/(t) 0 as t ∞\,.