Signed Partitions and Rogers-Ramanujan type Identities
Abstract
George Andrews [Bull. Amer. Math. Soc., 2007, 561--573] introduced the idea of a signed partiton of an integer; similar to an ordinary integer partitions, but where some of the parts could be negative. Further, Andrews reinterpreted the classical G\"ollnitz--Gordon partition identities in terms of signed partitions. In the present work, we provide interpretations of the sum sides of Rogers--Ramanujan type identities, including a new signed partition interpretation of the G\"ollnitz--Gordon identities, different from that of Andrews. Both analytic and bijective proofs are presented.
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