(n,sln)-graded Lie algebras (n=3,4)

Abstract

Let F be a field of characteristic zero and let g be a non-zero finite-dimensional split semisimple Lie algebra with root system . Let be a finite set of integral weights of g containing and \0\. Following [2,10], we say that a Lie algebra L over F is generalized root graded, or more exactly (,g)-graded, if L contains a semisimple subalgebra isomorphic to g, the g-module L is the direct sum of its weight subspaces Lα (α∈) and L is generated by all Lα with α0 as a Lie algebra. Let g sln and \[ n = \0,i j, i, 2i 1 ≤ i ≠ j ≤ n\ \] where \1, …, n\ is the set of weights of the natural sln-module. In [9], we classify (n,sln)-graded Lie algebras for n>4. In this paper we describe the multiplicative structures and the coordinate algebras of (n,sln)-graded Lie algebras (n=3,4). In n=3, we assume that \[ [V(2ω1) C,V(2ω1) C]=[V(2ω2) C',V(2ω2) C']=0 \] where V(ω) is the simple g-module of highest weight ω, C= Homg(V(2ω1),L) and C'= Homg(V(2ω2),L) .