This paper is devoted to asymptotic behaviors of heat equation corresponding to symmetric a-stable-like process X:=(Xt)t?0 on metric measure space.Denote pt(x,y) the heat kernel of the process, and by u(t,x) the solution of the associated heat equation.We then establish asymptotic behaviors between pt(x,y) and u(t,x) ,which enjoy similar properties of these in Riemannian manifolds.

a-stable-like process; Heat kernel; Heat equation; Asymptotic behaviors

[1]Vzquez J L.Asymptotic behaviour methods for the heat equation.Convergence to the Gaussian[J].arXiv:1706.10034.

[2]Vzquez J L.Asymptotic behaviour for the heat equation in hyperbolic space[J].arXiv:1811.09034.

[3]Anker J P,Papageorgiou E,Zhang H W.Asymptotic behavior of solutions to the heat equation on noncompact symmetric spaces[J].arXiv:2112.01323.

[4]Grigoryan A,Papageorgiou E,Zhang H W.Asymptotic behavior of the heat semigroup on certain Riemannian manifolds[J].arXiv:2205.06105.

[5]Grigoryan A,Hu J.Upper bounds of heat kernels on doubling spaces[J].Moscow Math.J,2014,14:505--563.

[6]Chen Z Q,Kumagai T,Wang J.Stability of heat kernel estimates for symmetric non-local Dirichlet forms[J].Memoirs Amer.Math.Soc.,2021,271:1330.

[7]Chen Z Q,Kumagai T,Wang J.Stability of parabolic Harnack inequalitiess for symmetric non-local Dirichlet forms[J].J.Eur.Math.Soc.,2020,22:3747--3803.