The Huang Algebra Ideal and the Diagonal Shift Property

Abstract

Let V be a grading-restricted vertex algebra and let A∞(V)=U∞(V)/Q∞(V) be the associative algebra constructed by Huang, where U∞(V) is the space of column-finite infinite matrices with entries in V and Q∞(V) is an ideal of a (nonassociative) algebra structure on U∞(V) defined by Huang. Huang introduced families of elements in Q∞(V) and conjectured that these elements generate Q∞(V). We discover and prove that Huang's elements all satisfy what we call ``the diagonal shift property". On the other hand, in the case that V is the rank one Heisenberg vertex operator algebra, we construct infinitely many linearly independent elements in Q∞(V) that do not satisfy the diagonal shift property. As a corollary, we disprove Huang's conjecture.