Local and Global Phaseless Sampling in Real Spline Spaces

TL;DR

This paper investigates conditions under which functions in real spline spaces can be uniquely reconstructed from unsigned samples, both locally and globally, providing characterizations and conditions for phaseless sampling sequences.

Contribution

It offers new characterizations of phaseless sampling sequences for real spline spaces, including local and global recovery, and introduces conditions for almost phaseless sampling.

Findings

Characterizations of phaseless sampling sequences for local and global recovery.

Necessary and sufficient conditions for local almost phaseless sampling.

Recovery of nonseparable functions up to a sign from unsigned samples.

Abstract

We study the recovery of functions in real spline spaces from unsigned sampled values. We consider two types of recovery. The one is to recover functions locally from finitely many unsigned samples. And the other is to recover functions on the whole line from infinitely many unsigned samples. In both cases, we give characterizations for a sequence of distinct points to be a phaseless sampling sequence, at which any nonseparable function is determined up to a sign on an interval or on the whole line by its unsigned sampled values. Moreover, for the case of local recovery, we also study the almost phaseless sampling and give a necessary and sufficient condition for a sequence of points to admit local recovery for almost all functions.