Kathrin Bringmann, Jeremy Lovejoy, Robert Osburn
Published 2008-02-22Version 1
We define two-parameter generalizations of two combinatorial constructions of Andrews: the kth symmetrized rank moment and the k-marked Durfee symbol. We prove that three specializations of the associated generating functions are so-called quasimock theta functions, while a fourth specialization gives quasimodular forms. We then define a two-parameter generalization of Andrews' smallest parts function and note that this leads to quasimock theta functions as well. The automorphic properties are deduced using q-series identities relating the relevant generating functions to known mock theta functions.
Comments: 18 pages
Journal: IMRN, no. 2, (2010), 238-260
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