The closed span of some Exponential system E in the spaces Lp(γ,β), properties of a Biorthogonal family to E in L2(γ,β), Moment problems, and a differential equation of Carleson

Abstract

A set of complex numbers =\λn,μn\n=1∞ with multiple terms \[ \λn,μn\n=1∞:= \λ1,λ1,…,λ1μ1 - times, λ2,λ2,…,λ2μ2 - times,…, λk,λk,…,λkμk - times,…\ \] is said to belong to the ABC class if it satisfies three conditions: (A) Σn=1∞μn/|λn|<∞, (B) n∈N|λn|<π/2, (C) is an interpolating variety for the space of entire functions of exponential type zero. Assuming that ∈ ABC, we characterize in the spirit of the M\"untz-Sz\'asz theorem, the closed span of its associated exponential system \[ E:=\xk eλn x:\, n∈N,\,\, k=0,1,2,…,μn-1\ \] in the Banach spaces Lp(γ,β), where -∞<γ<β<∞ and p 1. Related to E, we explore the properties of its unique biorthogonal sequence \[ r=\rn,k:\, n∈N,\, k=0,1,…,μn-1\⊂span(E) \] in L2(γ,β). As a result, we find a solution to the Moment problem \[ ∫γβ f(t)· tk eλn t\, dt=dn,k, ∀\,\, n∈N and k=0,1,… ,μn-1, dn,k=O(eaλn)\,\, for\,\, a<β. \] Finally, we characterize the solution space of a differential equation of infinite order, studied by L. Carleson.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…