Metric unconditionality and Fourier analysis
Abstract
We investigate several aspects of almost 1-unconditionality. We characterize the metric unconditional approximation property UMAP in terms of ``block unconditionality''. Then we focus on translation invariant subspaces LpE(T) and CE(T) of functions on the circle and express block unconditionality as arithmetical conditions on E. Our work shows that the spaces LpE(T), p an even integer, have a singular behaviour from the almost isometric point of view: property UMAP does not interpolate between spaces LpE(T) and Lp+2E(T). These arithmetical conditions are used to construct counterexamples for several natural questions and to investigate the maximal density of such sets E. We also prove that if E=\nk\k1 with |nk+1/nk|∞, then CE(T) has UMAP and we get a sharp estimate of the Sidon constant of Hadamard sets. Finally, we investigate the relationship of metric unconditionality and probability theory.
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