On the semi-regular frames of translates
Abstract
In this note, we fix a real invertible d× d matrix A and consider AZd as an index set. For f∈ L2(Rd), let Af:=1| A|Σk∈ Zd|f(AT)-1(·+k)|2 be the periodization of |f|2. By using Af, among other things, we characterize when the sequence τA(f):=\f(·-Ak)\k∈ Zd is a Bessel sequence, frame of translates, Riesz basis, or orthonormal basis. And finally, we construct an example, in which τA(f) is a Parseval frame of translates, but not a Riesz sequence.
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