Categorification of Virasoro-Magri Poisson vertex algebra
Seok-Jin Kang, Uhi Rinn Suh
TL;DR
This paper establishes a deep algebraic connection between the Grothendieck group of symmetric group modules and the Virasoro-Magri Poisson vertex algebra, revealing new algebraic structures and relations.
Contribution
It constructs an isomorphism between the Grothendieck group of symmetric group modules and the Virasoro-Magri Poisson vertex algebra, introducing new algebraic operations.
Findings
K_0(S) is isomorphic to the differential algebra of polynomials Z[D^n x]
Defined m-th products on K_0(S) to realize the Virasoro-Magri Poisson vertex algebra structure
Explored relations between K_0(S) and K_0(N) involving nil-Coxeter algebras
Abstract
Let S be the direct sum of algebra of symmetric groups C S_n for a non-negative integer n. We show that the Grothendieck group K_0(S) of the category of finite dimensional modules of S is isomorphic to the differential algebra of polynomials Z[D^n x]. Moreover, for a non-negative integer m, we define m-th products on K_0(S) which make the algebra K_0(S) isomorphic to an integral form of the Virasoro-Magri Poisson vertex algebra. Also, we investigate relations between K_0(S) and K_0(N) where K_0(N) is the direct sum of Grothendieck groups K_0(N_n) of finitely generated projective N_n-modules. Here N_n is the nil-Coxeter algebra generated by n-1 elements.
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Taxonomy
TopicsAlgebraic structures and combinatorial models · Advanced Topics in Algebra · Nonlinear Waves and Solitons