Parabolic BMO estimates for pseudo-differential operators of arbitrary order

Abstract

In this article we prove the BMO-L∞ estimate \|(-)γ/2 u\|BMO(Rd+1)≤ N \|∂∂ tu-A(t)u\|L∞(Rd+1), ∀\, u∈ C∞c(Rd+1) for a wide class of pseudo-differential operators A(t) of order γ∈ (0,∞). The coefficients of A(t) are assumed to be merely measurable in time variable. As an application to the equation ∂∂ tu=A(t)u+f, t∈ R we prove that for any u∈ C∞c(Rd+1) \|ut\|Lp(Rd+1)+\|(-)γ/2u\|Lp(Rd+1)≤ N\|ut-A(t)u\|Lp(Rd+1), where p\ in (1,∞) and the constant N is independent of u.