Random symmetric matrices: rank distribution and irreducibility of the characteristic polynomial
Abstract
Conditional on the extended Riemann hypothesis, we show that with high probability, the characteristic polynomial of a random symmetric \ 1\-matrix is irreducible. This addresses a question raised by Eberhard in recent work. The main innovation in our work is establishing sharp estimates regarding the rank distribution of symmetric random \ 1\-matrices over Fp for primes 2 < p ≤ (O(n1/4)). Previously, such estimates were available only for p = o(n1/8). At the heart of our proof is a way to combine multiple inverse Littlewood--Offord-type results to control the contribution to singularity-type events of vectors in Fpn with anticoncentration at least 1/p + (1/p2). Previously, inverse Littlewood--Offord-type results only allowed control over vectors with anticoncentration at least C/p for some large constant C > 1.
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