Density of the span of powers of a function \`a la M\"untz-Szasz

Abstract

The aim of this paper is to establish density properties in Lp spaces of the span of powers of functions \λ\,:λ∈\, ⊂ in the spirit of the M\"untz-Sz\'asz Theorem. As density is almost never achieved, we further investigate the density of powers and a modulation of powers \λ,λ eiα t\,:λ∈\. Finally, we establish a M\"untz-Sz\'asz Theorem for density of translates of powers of cosines \λ(t-θ\1),λ(t-θ\2)\,:λ∈\. Under some arithmetic restrictions on θ\1-θ\2, we show that density is equivalent to a M\"untz-Sz\'asz condition on and we conjecture that those arithmetic restrictions are not needed.Some links are also established with the recently introduced concept of Heisenberg Uniqueness Pairs.