Fractional heat semigroups on metric measure spaces with finite densities and applications to fractional dissipative equations

Abstract

Let ( M, d,μ) be a metric measure space with upper and lower densities: cases |||μ|||β:=(x,r)∈ M×(0,∞) μ(B(x,r))r-β<∞;\\ |||μ|||β:=∈f(x,r)∈ M×(0,∞) μ(B(x,r))r-β>0, cases where β, β are two positive constants which are less than or equal to the Hausdorff dimension of M. Assume that pt(·,·) is a heat kernel on M satisfying Gaussian upper estimates and L is the generator of the semigroup associated with pt(·,·). In this paper, via a method independent of Fourier transform, we establish the decay estimates for the kernels of the fractional heat semigroup \e-t Lα\t>0 and the operators \Lθ/2 e-t Lα\t>0, respectively. By these estimates, we obtain the regularity for the Cauchy problem of the fractional dissipative equation associated with L on ( M, d,μ). Moreover, based on the geometric-measure-theoretic analysis of a new Lp-type capacity defined in M×(0,∞), we also characterize a nonnegative Randon measure on M×(0,∞) such that Rα Lp( M)⊂eq Lq( M×(0,∞),) under (α,p,q)∈ (0,1)×(1,∞)×(1,∞), where u=Rα f is the weak solution of the fractional diffusion equation (∂t+ Lα)u(t,x)=0 in M×(0,∞) subject to u(0,x)=f(x) in M.