Obstructions for Gabor frames of the second order B-spline
Abstract
For a window g∈ L2(R), the subset of all lattice parameters (a, b)∈ R2+ such that G(g,a,b)=\e2π ib m·g(·-a k) : k, m∈Z\ forms a frame for L2(R) is known as the frame set of g. In time-frequency analysis, determining the Gabor frame set for a given window is a challenging open problem. In particular, the frame set for B-splines has many obstructions. Lemvig and Nielsen in counter conjectured that if align a0=12m+1,~ b0=2k+12,~k,m∈ N,~k>m,~a0b0<1, align then the Gabor system G(Q2, a, b) of the second order B-spline Q2 is not a frame along the hyperbolas align ab=2k+12(2m+1), for b∈ [b0-a0k-m2, b0+a0k-m2], align for every a0, b0. Nielsen in Nielsenthesis also conjectured that G(Q2, a,b) is not a frame for a=12m,~b=2k+12,~k,m∈ N,~k>m,~ab<1 with (4m,2k+1)=1. In this paper, we prove that both conjectures are true.
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