Operator-valued Fourier multipliers on periodic Besov spaces

Abstract

We prove in this paper that a sequence M:Zn(E) of bounded variation is a Fourier multiplier on the Besov space Bp,qs(Tn,E) for s∈R, 1<p<∞, 1≤ q≤∞ and E a Banach space, if and only if E is a UMD-space. This extends in some sense the Theorem 4.2 in [AB04] to the n-dimensional case. The result is used to obtain existence and uniqueness of solution for some Cauchy problems with periodic boundary conditions.