(d,σ)-twisted Affine-Virasoro superalgebras

Abstract

For any finite dimensional Lie superalgebra g (maybe a Lie algebra) with an even derivation d and a finite order automorphism σ that commutes with d, we introduce the (d,σ)-twisted Affine-Virasoro superalgebra L=L(g,d,σ) and determine its universal central extension L=L(g,d,σ). This is a huge class of infinite-dimensional Lie superalgebras. Such Lie superalgebras consist of many new and well-known Lie algebras and superalgebras, including the Affine-Virasoro superalgebras, the twisted Heisenberg-Virasoro algebra, the mirror Heisenberg-Virasoro algebra, the W-algebra W(2,2), the gap-p Virasoro algebras, the Fermion-Virasoro algebra, the N=1 BMS superalgebra, the planar Galilean conformal algebra. Then we give the classification of cuspidal AL-modules by using the weighting functor from U(h)-free modules to weight modules. Consequently, we give the classification of simple cuspidal L-modules by using the A-cover method. Finally, all simple quasi-finite modules over L and L are classified. Our results recover many known Lie superalgebra results from mathematics and mathematical physics, and give many new Lie superalgebras.