Regular actions and semisimplicity of conformal modules over the general conformal algebra
Abstract
We introduce the notion of a regular action in the category of conformal modules over Lie conformal algebras with Virasoro elements. We show that a finite conformal module over the general conformal algebra gc1 (resp., gcN with N2) is semisimple if and only if there exists a pair of different Virasoro elements (resp., canonical Virasoro elements) with regular actions. Along the way to finding a semisimplicity criteria, we also discuss the classification of Virasoro elements of gcN in-depth, leading us to construct a huge number of new Virasoro conformal modules.
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