Quantitative bounds for unconditional pairs of frames

Abstract

We formulate a quantitative finite-dimensional conjecture about frame multipliers and prove that it is equivalent to Conjecture 1 in [SB2]. We then present solutions to the conjecture for certain classes of frame multipliers. In particular, we prove that there is a universal constant >0 so that for all C,β>0 and N∈N the following is true. Let (xj)j=1N and (fj)j=1N be sequences in a finite dimensional Hilbert space which satisfy \|xj\|=\|fj\| for all 1≤ j≤ N and \|Σj=1N j x,fj xj\|≤ C\|x\|, for all x∈ 2M and |j|=1. If the frame operator for (fj)j=1N has eigenvalues λ1≥...≥λM and λ1≤ β M-1Σj=1Mλj then (fj)j=1N has Bessel bound β2 C. The same holds for (xj)j=1N.

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