On the Support of Weight Modules for Affine Kac-Moody-Algebras

Abstract

An irreducible weight module of an affine Kac-Moody algebra g is called dense if its support is equal to a coset in h*/Q. Following a conjecture of V. Futorny about affine Kac-Moody algebras g, an irreducible weight g-module is dense if and only if it is cuspidal (i.e. not a quotient of an induced module). The conjecture is confirmed for g=A2(1), A3(1) andA4(1) and a classification of the supports of the irreducible weight g-modules obtained. For all An(1) the problem is reduced to finding primitive elements for only finitely many cases, all lying below a certain bound. For the left-over finitely many cases an algorithm is proposed, which leads to the solution of Futorny's conjecture for the cases A2(1) and A3(1). Yet, the solution of the case A4(1) required additional combinatorics. For the proofs, a new category of hypoabelian Lie subalgebras, pre-prosolvable subalgebras, and a subclass thereof, quasicone subalgebras, is introduced and its tropical matrix algebra structure outlined.