Construction of frames for shift-invariant spaces
Abstract
We construct a sequence φi(·-j) j∈, i=1,...,r which constitutes a p-frame for the weighted shift-invariant space [Vpμ()=Σi=1rΣj∈Zci(j)φi(·-j) | ci(j)j∈Z∈pμ, i=1,...,r, p∈[1,∞],] and generates a closed shift-invariant subspace of Lpμ(R). The first construction is obtained by choosing functions φi, i=1,...,r, with compactly supported Fourier transforms φi, i=1,...,r. The second construction, with compactly supported φi,i=1,...,r, gives the Riesz basis.
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