Existence of Unconditional Frames Formed By System of Translates in Modulation Spaces

Abstract

Let 1≤ p≤ 2 and let = \λn\n∈ N ⊂eq R be an arbitrary subset. We prove that for any g∈ Mp(R) with 1≤ p≤ 2 the system of translates \g(x-λn)\n∈ N is never an unconditional basis for Mq(R) for p≤ q≤ p', where p' is the conjugate exponent of p. In particular, M1(R) does not admit any Schauder basis formed by a system of translates. We also prove that for any g∈ Mp(R) with 1< p≤ 2 the system of translates \g(x-λn)\n∈ N is never an unconditional frame for Mp(R). Several results regarding the existence of unconditional frames formed by a system of translates in M1(R) as well as in Mp(R) with 2<p<∞ will be presented as well.

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