An Lq(Lp)-theory for parabolic pseudo-differential equations: Calder\'on-Zygmund approach

Abstract

In this paper we present a Calder\'on-Zygmund approach for a large class of parabolic equations with pseudo-differential operators A(t) of arbitrary order γ∈(0,∞). It is assumed that (t) is merely measurable with respect to the time variable. The unique solvability of the equation ∂ u∂ t= u-λ u+f, (t,x)∈ d+1 and the Lq(,Lp)-estimate \|ut\|Lq(,Lp)+\|(-)γ/2u\|Lq(,Lp) +λ\|u\|Lq(,Lp)≤ N\|f\|Lq(,Lp) are obtained for any λ > 0 and p,q∈ (1,∞).