Classification of Irreducible Modules¶ofAlgebra withc=− 2

In this paper, we first present a classification theorem of simple infinitedimensional Novikov algebras over an algebraically closed field of characteristic 0. Then we classify all the irreducible modules of certain infinite-dimensional simple Novikov algebras with an idempotent element whose left a

We classify the irreducible modules for the fixed point vertex operator subalgebra of the vertex operator algebra associated to the Heisenberg algebra with central charge 1 under the y1 automorphism.

We classify the 2F-modules for nearly simple groups, excluding the case of modules for groups of Lie type in their defining characteristic. We also show that for all such modules there exists an offender with cubic action. These modules play a crucial role in the current revisions of the classificat

We classify the irreducible weight affine Lie algebra modules with finite-dimensional weight spaces on which the central element acts nontrivially. In particular, we show that any such module is a quotient of a generalized Verma module. The classification of such irreducible modules is reduced to th