A Generalized Burge Correspondence and k-measure of Partitions

Abstract

Let P be the set of integer partitions and D the subset of those with distinct parts. We extend a correspondence of Burge between partitions and binary words to give encodings of both D and D as words over a k-ary alphabet, for any fixed k≥ 2. These are used to prove refinements of two partition identities involving k-measure that were recently derived algebraically by Andrews, Chern and Li. The relationship between our encoding of D and minimum gap-size partition identities (e.g. Schur's Theorem) is also briefly discussed.