An Lq(Lp)-theory for the time fractional evolution equations with variable coefficients

Abstract

We introduce an Lq(Lp)-theory for the quasi-linear fractional equations of the type ∂αt u(t,x)=aij(t,x)uxi xj(t,x)+f(t,x,u), t>0, \,x∈ Rd. Here, α∈ (0,2), p,q>1, and ∂αt is the Caupto fractional derivative of order α. Uniqueness, existence, and Lq(Lp)-estimates of solutions are obtained. The leading coefficients aij(t,x) are assumed to be piecewise continuous in t and uniformly continuous in x. In particular aij(t,x) are allowed to be discontinuous with respect to the time variable. Our approach is based on classical tools in PDE theories such as the Marcinkiewicz interpolation theorem, the Calderon-Zygmund theorem, and perturbation arguments.