Twisted φ-coordinated modules for vertex algebras and Zhu's correspondence theorem
Abstract
Let V be a vertex algebra and g be an automorphism of V of order T. For any n, m ∈ (1/T)N, we construct an Ag,n(V)\!-\!Ag,m(V)-bimodule Ag,n,m(V), where Ag,n(V) denotes the associative algebra constructed by the authors in Shun1. We introduce the notion of (1/T)N-graded g-twisted φ-coordinated V-modules and prove that there exists a bijection between the simple Ag(V)-modules and the irreducible (1/T)N-graded g-twisted φ-coordinated V-modules, where Ag(V)=Ag,0(V). We construct the universal enveloping algebra U(V[g]), showing that Ag(V) is subquotient of U(V[g]). When V is vertex operator algebra, we show that each Ag,n,m(V) is isomorphic to the Ag,n(V)-Ag,m(V)-bimodule Ag,n,m(V) constructed by Dong and Jiang~DJ2. Also we prove that there exists a bijection between the irreducible admissible g-twisted V-modules and the irreducible (1/T)N-graded g-twisted φ-coordinated V-modules.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.