The Euler-Glaisher Theorem over Totally Real Number Fields

Abstract

In this paper, we study the partition theory over totally real number fields. Let K be a totally real number field. A partition of a totally positive algebraic integer δ over K is λ=(λ1,λ2,…,λr) for some totally positive integers λi such that δ=λ1+λ2+·s+λr. We find an identity to explain the number of partitions of δ whose parts do not belong to a given ideal a. We obtain a generalization of the Euler-Glaisher Theorem over totally real number fields as a corollary. We also prove that the number of solutions to the equation δ=x1+2x2+·s+nxn with xi totally positive or 0 is equal to that of chain partitions of δ. A chain partition of δ is a partition λ=(λ1,λ2,…,λr) of δ such that λi+1-λi is totally positive or 0.

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