Functional Ghobber-Jaming 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. Let M,N⊂eq \1, …, n\ be such that align* o(M)1qo(N)1p< 1 1≤ j,k≤ n|gk(τj) |, align* where q is the conjugate index of p. Then for all x ∈ X, we show that alignFGJU (1) \|x\|≤ (1+11-o(M)1qo(N)1p1≤ j,k≤ n|gk(τj)|)[(Σj∈ Mc|fj(x)|p)1p+(Σk∈ Nc|gk(x) |p)1p]. align We call Inequality (1) as Functional Ghobber-Jaming Uncertainty Principle. Inequality (1) improves the uncertainty principle obtained by Ghobber and Jaming [Linear Algebra Appl., 2011].