Uniform discretization of continuous frames
Abstract
Let H be an infinite-dimensional separable Hilbert space and let (X,d,μ) be a metric measure space satisfying the doubling and upper Alhfors regularity conditions at small scale. We prove that every bounded continuous tight frame X→ H can be sampled to obtain a frame for H, which is uniformly discrete and nearly tight. That is, for every 0<ε<1, there exist a sampling sequence \xn\n∈N in X and r>0 such that ∈fn≠ md(xn,xm)≥ r and \(xn)\n∈N is a frame whose ratio of frame bounds is less than 1+ε. We apply our main result to show that for every nonzero function g in L2(Rd) there exists a uniformly discrete set such that the corresponding Gabor system \e2π ibxg(x-a)\(a,b)∈ is a nearly tight frame. We also prove that if ∈ L2(R) satisfies the Calder\'on admissibility condition, then there exists a uniformly discrete set such that wavelet system \a1/2(ax-b)\(a,b)∈ is a nearly tight frame. Analogous discretization results for exponential frames and spectral subspaces of elliptic differential operators are presented as well.
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