Nonharmonic multivariate Fourier transforms and matrices: condition numbers and hyperplane geometry

Abstract

Consider an operator that takes the Fourier transform of a discrete measure supported in X⊂[- 12, 12)d and restricts it to a compact ⊂Rd. We provide lower bounds for its smallest singular value when is either a closed ball of radius m or closed cube of side length 2m, and under different types of geometric assumptions on X. We first show that if distances between points in X are lower bounded by a δ that is allowed to be arbitrarily small, then the smallest singular value is at least Cmd/2 (mδ)λ-1, where λ is the maximum number of elements in X contained within any ball or cube of an explicitly given radius. This estimate communicates a localization effect of the Fourier transform. While it is sharp, the smallest singular value behaves better than expected for many X, including when we dilate a generic set by parameter δ. We next show that if there is a η such that, for each x∈X, the set X\x\ locally consists of at most r hyperplanes whose distances to x are at least η, then the smallest singular value is at least C md/2 (mη)r. For dilations of a generic set by δ, the lower bound becomes C md/2 (mδ) (λ-1)/d . The appearance of a 1/d factor in the exponent indicates that compared to worst case scenarios, the condition number of nonharmonic Fourier transforms is better than expected for typical sets and improve with higher dimensionality.

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