Unconditional structures of translates for Lp(Rd)

Abstract

We prove that a sequence (fi)i=1∞ of translates of a fixed f∈ Lp(R) cannot be an unconditional basis of Lp(R) for any 1 p<∞. In contrast to this, for every 2<p<∞, d∈ N and unbounded sequence (λn)n∈ N⊂ Rd we establish the existence of a function f∈ Lp(Rd) and sequence (g*n)n∈ N⊂ Lp*(Rd) such that (Tλn f, g*n)n∈ N forms an unconditional Schauder frame for Lp(Rd). In particular, there exists a Schauder frame of integer translates for Lp(R) if (and only if) 2<p<∞.