Functional Donoho-Stark Approximate Support Uncertainty Principle

Abstract

Let (\fj\j=1n, \τj\j=1n) and (\gk\k=1n, \ωk\k=1n) be two p-orthonormal bases for a finite dimensional Banach space X. If x ∈ X\0\ is such that θfx is -supported on M⊂eq \1,…, n\ w.r.t. p-norm and θgx is δ-supported on N⊂eq \1,…, n\ w.r.t. p-norm, then we show that alignME (1) &o(M)1po(N)1q≥ 1 1≤ j,k≤ n|fj(ωk) | \1--δ, 0\,\\ (2) &o(M)1qo(N)1p≥ 1 1≤ j,k≤ n|gk(τj) | \1--δ, 0\,ME2 align where align* θf: X x (fj(x) )j=1n ∈ p([n]); θg: X x (gk(x) )k=1n ∈ p([n]) align* and q is the conjugate index of p. We call Inequalities (1) and (2) as Functional Donoho-Stark Approximate Support Uncertainty Principle. Inequalities (1) and (2) improve the finite approximate support uncertainty principle obtained by Donoho and Stark [SIAM J. Appl. Math., 1989].