Multiple Rogers--Ramanujan type identities for torus links
Abstract
In this paper, we establish simple k-fold summation expressions for the Quot and motivic Cohen--Lenstra zeta functions associated with the (2,2k) torus links. Such expressions lead us to some multiple Rogers--Ramanujan type identities and their finitizations, thereby confirming a conjecture of Huang and Jiang. Several other properties of the two zeta functions will be examined as well.
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