A spectral resolution of the large sieve

Abstract

The quadratic form V(,Q)=Σq QΣa* q|S(,a/q)|2 and its eigenvalues are well understood when Q=o(N), while V(,Q) is expected to behave like a Riemann sum when N=o(Q). The behavior in the range Q∈[N,100 N] is still mysterious. In the present work we present a full spectral analysis when Q N7/8 in terms of the eigenvalues of a one-parameter family of nuclear difference operators. We show in particular that (a smoothed version of) the quadratic form V(,Q) may stay away from (6/π2)QΣn|n|2 when Q N, though only on a vector space of positive but small dimension. An improved version of this paper, with the same title, will appear (2024 or 2025) in the Bulletin of the French Mathematical Society.