Frame Soft Shrinkage as Proximity Operator
Abstract
Let H and K be real Hilbert spaces and T ∈ B ( H, K) an injective operator with closed range and Moore-Penrose inverse T. Based on the well-known characterization of proximity operators by Moreau, we prove that for any proximity operator Prox K K the operator T \, Prox \, T is a proximity operator on the linear space H equipped with a suitable norm. In particular, it follows for the frequently applied soft shrinkage operator Prox = Sλ 2 → 2 and any frame analysis operator T H 2, that the frame shrinkage operator T\, Sλ\, T is a proximity operator in a suitable Hilbert space.
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