Rigidity and Cohomology of Seaweed Lie Algebras

Abstract

Seaweed (biparabolic) subalgebras form a large and structurally rich class of subalgebras of simple Lie algebras. We determine their adjoint cohomology. If s is an indecomposable seaweed subalgebra of a complex simple Lie algebra, then \[ H(s,s)=0, \] and hence s is absolutely rigid. If s is decomposable, then the Coll--Gerstenhaber decomposition for Lie semidirect products gives, for each n 0, a canonical description of Hn(s,s) in terms of exterior powers of Z(s) and the zero-weight cohomology of s/Z(s). In particular, the center is the unique source of nontrivial adjoint cohomology. These results identify indecomposability as the precise condition for cohomological rigidity and give a uniform description of adjoint cohomology for seaweed Lie algebras.