Orthogonal roots, quantum Hafnians, and generalized Rothe diagrams

Abstract

Let U be a set of positive roots of type ADE, and let U be the set of all maximum-cardinality orthogonal subsets of U. For each element R ∈ U, we define a generalized Rothe diagram whose cardinality we call the level, (R), of R. We define the generalized quantum Hafnian of U to be the generating function for , regarded as a q-polynomial in U. In this paper, we study a large number of examples of sets of the form U, and we explore their connections with a variety of widely studied algebraic and combinatorial objects. One of our motivating examples involves a certain set of k2 roots in type D2k, where the elements of U can be identified with permutations in Sk, the generalized Rothe diagrams are the traditional Rothe diagrams associated to permutations, and the generalized quantum Hafnian is the q-permanent. More generally, all our examples in types A and D are closely related to perfect matchings and rook configurations, and our examples in type E have applications to del Pezzo surfaces and labellings of Fano planes. Each of our examples also gives rise to a matroid, and a large family of our examples is in a natural correspondence with the equal-rank simply-laced symmetric pairs.

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