Asymptotic behaviours of solution to Caputo–Hadamard fractional partial differential equation with fractional Laplacian
Changpin Li, Zhiqiang Li
Abstract
In this paper, we study the asymptotic behaviours of solution to time–space fractional diffusion equation, where the time derivative with order α is in the sense of Caputo–Hadamard and the spatial derivative is in the sense of fractional Laplacian. Applying the newly customized integral transforms, i.e. the amended Laplace transform and the amended Mellin transform, the fundamental solution of the equation with α∈(0,1) can be obtained and its asymptotic estimates are shown. Then we study the decay estimate of the solution to the considered equation in Lp(Rd) and Lp,∞(Rd). Furthermore, gradient estimates and large time behaviour of the solution are displayed. Finally, optimal L2 decay estimate of the solution are obtained by Fourier analysis techniques.