W_{1+\infty} and W(gl_N) with central charge N
E. Frenkel, V. Kac, A. Radul, W. Wang
TL;DR
This paper explores the structure and representations of the W-infinity algebra and W(gl_N), providing character formulas, establishing a duality with gl_N modules, and conjecturing fusion rules, thereby advancing understanding of these algebraic objects.
Contribution
It introduces a complete characterization of primitive representations of the W-infinity algebra and their correspondence with W(gl_N) representations at central charge N.
Findings
Derived explicit character formulas for primitive representations.
Established a duality between W(gl_N) modules and gl_N modules.
Conjectured fusion rules for the representations.
Abstract
We study representations of the central extension of the Lie algebra of differential operators on the circle, the W-infinity algebra. We obtain complete and specialized character formulas for a large class of representations, which we call primitive; these include all quasi-finite irreducible unitary representations. We show that any primitive representation with central charge N has a canonical structure of an irreducible representation of the W-algebra W(gl_N) with the same central charge and that all irreducible representations of W(gl_N) with central charge N arise in this way. We also establish a duality between "integral" modules of W(gl_N) and finite-dimensional irreducible modules of gl_N, and conjecture their fusion rules.
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Taxonomy
TopicsAdvanced Topics in Algebra · Nonlinear Waves and Solitons · Algebraic structures and combinatorial models