Multiple Rogers-Ramanujan type identities for inert quadratic orders
Abstract
We compute the Quot and finitized Coh zeta functions of the inert quadratic orders Fq[[T]]+TmFq2[[T]] for every m≥ 1 in terms of a 2m-fold multisum, and then show this multisum equals an m-fold Bressoud sum. This proves a recent conjecture of the second author, rounding up the line of exploration in the series of work by the authors and Jiang. The equality between the 2m-fold multisum and the m-fold Bressoud sum is built upon generalizing the multisum by introducing a ``ghost'' parameter a to its summands. We then show that such an a-generalization is surprisingly a-independent by purely q-theoretic techniques. Finally, we propose a refined multisum that interpolates two versions of Quot zeta functions for all three types of quadratic orders.
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