Regular functionals on seaweed Lie algebras

Abstract

The index of a Lie algebra g is defined by ind g= f∈ g*( (Bf)), where f is an element of the linear dual g* and Bf(x,y)=f([x,y]) is the associated skew-symmetric Kirillov form. We develop a broad general framework for the explicit construction of regular (index realizing) functionals for seaweed subalgebras of gl(n) and the classical Lie algebras: An=sl(n+1), Bn=so(2n+1), and Cn=sp(2n). Until now, this problem has remained open in gl(n) -- and in all the classical types.