English

Vertex operator algebras and weak Jacobi forms

Quantum Algebra 2015-08-27 v1 Mathematical Physics math.MP

Abstract

Let VV be a strongly regular vertex operator algebra. For a state hV1h \in V_1 satisfying appropriate integrality conditions, we prove that the space spanned by the trace functions TrMqL(0)c/24ζh(0)(_Mq^{L(0)-c/24}\zeta^{h(0)} (Ma a Vmodule)isavectorvaluedweakJacobiformofweight0andacertainindex-module) is a vector-valued weak Jacobi form of weight 0 and a certain index <h, h >/2.Wediscussrefinementsandapplicationsofthisresultwhen. We discuss refinements and applications of this result when Visholomorphic,inparticularweprovethatif is holomorphic, in particular we prove that if g = e^{h(0)}isafiniteorderautomorphismthenTr is a finite order automorphism then Tr_V q^{L(0)-c/24}gisamodularfunctionofweight0onacongruencesubgroupof is a modular function of weight 0 on a congruence subgroup of SL_2(Z)$.

Keywords

Cite

@article{arxiv.1103.0994,
  title  = {Vertex operator algebras and weak Jacobi forms},
  author = {Matthew Krauel and Geoffrey Mason},
  journal= {arXiv preprint arXiv:1103.0994},
  year   = {2015}
}
R2 v1 2026-06-21T17:35:25.656Z