Zeros in the Character Tables of Symmetric Groups with an -Core Index

Abstract

Let Cn = [λ(μ)]λ, μ be the character table for Sn, where the indices λ and μ run over the p(n) many integer partitions of n. In this note we study Z(n), the number of zero entries λ(μ) in Cn, where λ is an -core partition of n. For every prime ≥ 5, we prove an asymptotic formula of the form Z(n) α· σ(n+δ)p(n) n-52eπ2n/3, where σ(n) is a twisted Legendre symbol divisor function, δ:=(2-1)/24, and 1/α>0 is a normalization of the Dirichlet L-value L((·),-12). For primes and n>6/24, we show that λ(μ)=0 whenever λ and μ are both -cores. Furthermore, if Z*(n) is the number of zero entries indexed by two -cores, then for ≥ 5 we obtain the asymptotic Z*(n) α2 · σ( n+δ)2 n-3.

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