Toral posets and the binary spectrum property

Abstract

We introduce a family of posets which generate Lie poset subalgebras of An-1=sl(n) whose index can be realized topologically. In particular, if P is such a toral poset, then it has a simplicial realization which is homotopic to a wedge sum of d one-spheres, where d is the index of the corresponding type-A Lie poset algebra gA(P). Moreover, when gA(P) is Frobenius, its spectrum is binary; that is, consists of an equal number of 0's and 1's. We also find that all Frobenius, type-A Lie poset algebras corresponding to a poset whose largest totally ordered subset is of cardinality at most three have a binary spectrum.