Deep congruences + the Brauer-Nesbitt theorem
Abstract
We prove that mod-p congruences between polynomials in Zp[X] are equivalent to deeper p-power congruences between power-sum functions of their roots. This result generalizes to torsion-free Z(p)-algebras modulo divided-power ideals. Our approach is combinatorial: we introduce a p-equivalence relation on partitions, and use it to prove that certain linear combinations of power-sum functions are p-integral. We also include a second proof, short and algebraic, suggested by an anonymous referee. As a corollary we obtain a refinement of the Brauer-Nesbitt theorem for a single linear operator, motivated by the study of Hecke modules of mod-p modular forms.
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