On equiangular lines in 17 dimensions and the characteristic polynomial of a Seidel matrix
Abstract
For e a positive integer, we find restrictions modulo 2e on the coefficients of the characteristic polynomial S(x) of a Seidel matrix S. We show that, for a Seidel matrix of order n even (resp. odd), there are at most 2e-22 (resp. 2e-22+1) possibilities for the congruence class of S(x) modulo 2e Z[x]. As an application of these results, we obtain an improvement to the upper bound for the number of equiangular lines in R17, that is, we reduce the known upper bound from 50 to 49.
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