Abstract
We introduce the notions of quasi-Laurent and Laurent families of simple modules over quiver Hecke algebras of arbitrary symmetrizable types. We prove that such a family plays a similar role of a cluster in quantum cluster algebra theory and exhibits a quantum Laurent positivity phenomenon similar to the basis of the quantum unipotent coordinate ring, coming from the categorification. Then we show that the families of simple modules categorifying Geiβ-Leclerc-Schröer (GLS) clusters are Laurent families by using the Poincaré-Birkhoff-Witt (PBW) decomposition vector of a simple module and categorical interpretation of (co)degree of. As applications of such -vectors, we define several skew-symmetric pairings on arbitrary pairs of simple modules, and investigate the relationships among the pairings and -invariants of -matrices in the quiver Hecke algebra theory.
Original language | English |
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Pages (from-to) | 1916-1940 |
Number of pages | 25 |
Journal | Compositio Mathematica |
Volume | 160 |
Issue number | 8 |
DOIs | |
State | Published - 11 Sep 2024 |
Keywords
- g-vector
- Laurent family
- quantum cluster algebra
- quantum Laurent positivity
- R-matrix