Optimal shift-invariant spaces from uniform measurements
Abstract
Let m be a positive integer and C be a collection of closed subspaces in L2(R). Given the measurements FY= yk1 k∈ Z,…, ykm k∈ Z ⊂ 2(Z) of unknown functions F=\f1, …,fm \ ⊂ L2( R), in this paper we study the problem of finding an optimal space S in C that is ``closest" to the measurements FY of F. Since the class of finitely generated shift-invariant spaces (FSISs) is popularly used for modelling signals, we assume C consists of FSISs. We will be considering three cases. In the first case, C consists of FSISs without any assumption on extra invariance. In the second case, we assume C consists of extra invariant FSISs, and in the third case, we assume C has translation-invariant FSISs. In all three cases, we prove the existence of an optimal space.
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