Weighted Lq(Lp)-estimate with Muckenhoupt weights for the diffusion-wave equations with time-fractional derivatives

Abstract

We present a weighted Lq(Lp)-theory (p,q∈(1,∞)) with Muckenhoupt weights for the equation ∂tαu(t,x)= u(t,x) +f(t,x), t>0, x∈ Rd. Here, α∈ (0,2) and ∂tα is the Caputo fractional derivative of order α. In particular we prove that for any p,q∈ (1,∞), w1(x)∈ Ap and w2(t)∈ Aq, ∫∞0(∫Rd |uxx|p \,w1 dx )q/p\,w2dt ≤ N ∫∞0(∫Rd |f|p \,w1 dx )q/p\,w2dt, where Ap is the class of Muckenhoupt Ap weights. Our approach is based on the sharp function estimates of the derivatives of solutions.