Relaxed and logarithmic modules of sl3

Abstract

In [8], the affine vertex algebra Lk(sl2) is realized as a subalgebra of the vertex algebra Virc (0), where Virc is a simple Virasoro vertex algebra and (0) is a half-lattice vertex algebra. Moreover, all Lk(sl2)--modules (including, modules in the category KLk, relaxed highest weight modules and logarithmic modules) are realized as Virc (0)--modules. A natural question is the generalization of this construction in higher rank. In the current paper, we study the case g= sl3 and present realization of the VOA Lk( g) for k Z 0 as a vertex subalgebra of Wk S (0), where Wk is a simple Breshadsky Polykov vertex algebra and S is the β γ vertex algebra. We use this realization to study ordinary modules, relaxed highest weight modules and logarithmic modules. We prove the irreducibility of all our relaxed highest weight modules having finite-dimensional weight spaces (whose top components are Gelfand-Tsetlin modules). The irreducibility of relaxed highest weight modules with infinite-dimensional weight spaces is proved up to a conjecture on the irreducibility of certain g--modules which are not Gelfand-Tsetlin modules. The next problem that we consider is the realization of logarithmic modules. We first analyse the free-field realization of Wk from [11] and obtain a realization of logarithmic modules for Wk of nilpotent rank two at most admissible levels. Using logarithmic modules for the β γ VOA, we are able to construct logarithmic Lk( g)--modules of rank three.

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