Delsarte LP on the quadratic-form association scheme proves that |E| ≳ q^{n/2 + 1/3} forces |Δ_Q(E)| ≫ q for even n and large odd prime-power q.
$L^p$ averages of the Fourier transform in finite fields
3 Pith papers cite this work. Polarity classification is still indexing.
abstract
The Fourier transform plays a central role in many geometric and combinatorial problems cast in vector spaces over finite fields. If a set admits optimal $L^\infty$ bounds on its Fourier transform (that is, it is a Salem set), then it can often be analysed more easily. However, in many cases obtaining good \emph{uniform} bounds is not possible, even if `most' points admit good pointwise bounds. Motivated by this, we propose a framework where one systematically studies the $L^p$ averages of the Fourier transform and keeps track of how good the $L^p$ bounds are as a function of $p$. This captures more nuanced information about a set than, for example, asking whether it is Salem or not. We explore this idea by considering several examples and find that a rich theory emerges. Further, we provide various applications of this approach; including to sumset type problems, the finite fields distance conjecture, and the problem of counting $k$-simplices inside a given set. Our typical application is of the form:~if a set admits good $L^p$ bounds on its Fourier transform, then we are able to make strong geometric conclusions.
years
2026 3representative citing papers
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Delsarte LP on the quadratic-form association scheme proves that |E| ≳ q^{n/2 + 1/3} forces |Δ_Q(E)| ≫ q for even n and large odd prime-power q.
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