On the number of parts in all partitions enumerated by the Rogers-Ramanujan identities

Abstract

The celebrated Rogers-Ramanujan identities equate the number of integer partitions of n (n∈ N0) with parts congruent to 1 5 (respectively 2 5) and the number of partitions of n with super-distinct parts (respectively super-distinct parts greater than 1). In this paper, we establish companion identities to the Rogers-Ramanujan identities on the number of parts in all partitions of n of the aforementioned types, in the spirit of earlier work by Andrews and Beck on a partition identity of Euler.