Ostrik, VictorXu, Tianyuan2017-09-062017-09-062017-09-06https://hdl.handle.net/1794/22741Let (W, S) be an arbitrary Coxeter system, and let J be the asymptotic Hecke algebra associated to (W, S) via Kazhdan-Lusztig polynomials by Lusztig. We study a subalgebra J_C of J corresponding to the subregular cell C of W . We prove a factorization theorem that allows us to compute products in J_C without inputs from Kazhdan-Lusztig theory, then discuss two applications of this result. First, we describe J_C in terms of the Coxeter diagram of (W, S) in the case (W, S) is simply- laced, and deduce more connections between the diagram and J_C in some other cases. Second, we prove that for certain specific Coxeter systems, some subalgebras of J_C are free fusion rings, thereby connecting the algebras to compact quantum groups arising in operator algebra theory.en-USAll Rights Reserved.Coxeter groupsFusion categoriesHecke algebrasKazhdan-Lusztig theoryPartition quantum groupsTensor categoriesElectronic Thesis or Dissertation