A Walsh-Quotient Obstruction for Fourier Frames on Odd Reciprocal-Power Bernoulli Convolutions

Abstract

We introduce a Walsh--quotient obstruction to study Fourier-frame existence for symmetric two-branch Bernoulli convolutions \[ μρ,d =j=1∞ 12(δ-dρj/2+δdρj/2), 0<ρ<1, d>0. \] Suppose that 0<ρ<12 and ρ-m=B for some integer m1 and odd integer B3. We prove that L2(μρ,d) admits no Fourier frame. For m=1, our argument proves the nonexistence of Fourier frames for odd-integer-base Cantor measures and hence resolves Strichartz's long-standing open problem for the middle-third Cantor measure. A contemporaneous independent proof of the case m=1 was obtained by Pont, Liehr and Taylor [arXiv:2607.08656v1]. For m>1, our theorem includes the non-integer reciprocal-power contraction ratios ρ=B-1/m, which fall outside the classical integer-base Cantor-measure setting. Our proof is self-contained. It uses finite-coordinate Walsh packets to transform the frame inequalities into incompatible tangent-quotient estimates, while the identity ρ-m=B supplies the exact m-step scale relation leading to the contradiction.

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