An Extension of P\'olya's Enumeration Theorem

Abstract

In combinatorics, P\'olya's Enumeration Theorem is a powerful tool for solving a wide range of counting problems, including the enumeration of groups, graphs, and chemical compounds. In this paper, we present an extension of P\'olya's Enumeration Theorem. As an application, we derive a formula that expresses the n-th elementary symmetric polynomial in m indeterminates (where n≤ m) as a variant of the cycle index polynomial of the symmetric group Sym(n). This result resolves a problem posed by Amdeberhan in 2012.

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