Beck-type identities for Euler pairs of order r

Abstract

Partition identities are often statements asserting that the set PX of partitions of n subject to condition X is equinumerous to the set PY of partitions of n subject to condition Y. A Beck-type identity is a companion identity to | PX|=| PY| asserting that the difference b(n) between the number of parts in all partitions in PX and the number of parts in all partitions in PY equals a c| PX'| and also c| PY'|, where c is some constant related to the original identity, and X', respectively Y', is a condition on partitions that is a very slight relaxation of condition X, respectively Y. A second Beck-type identity involves the difference b'(n) between the total number of different parts in all partitions in PX and the total number of different parts in all partitions in PY. We extend these results to Beck-type identities accompanying all identities given by Euler pairs of order r (for any r≥ 2). As a consequence, we obtain many families of new Beck-type identities. We give analytic and bijective proofs of our results.