Quantized cohomological Hall algebra of the d-loop quiver revisited
Abstract
Let be the set of partitions of length ≥ 0. We introduce an N-graded algebra Aqd() associated to , which can be viewed as a quantization of the algebra of partitions defined by Reineke. The multiplication of Adq() has some kind of quasi-commutativity, and the associativity comes from combinatorial properties of certain polynomials appeared in the quantized cohomological Hall algebra Hdq of the d-loop quiver. It turns out that Adq() is isomorphic to Hdq, thus can be viewed as a combinatorial realization for Hdq.
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