Unconditional Frames of Translates in Lp(Rd)

Abstract

We show that, for 1<p 2, the space Lp(Rd) does not admit unconditional Schauder frames fi,fi'i∈N where fi is a sequence of translates of finitely many functions and fi' is seminormalized. In fact, the only subspaces of Lp(Rd) admitting such Banach frames are those isomorphic to p. On the other hand, if 2<p<+∞ and λii∈N⊂eq Rd is an unbounded sequence, there is a subsequence λmii∈N, a function f∈ Lp(Rd), and a seminormalized sequence of bounded functionals fi'i∈N such that Tλmif,fi'i∈N is an unconditional Schauder frame for Lp(Rd).