Robert Pervine scite author profile

For a rank two root system and a pair of nonnegative integers, using only elementary combinatorics we construct two posets. The constructions are uniform across the root systems A 1 ⊕ A 1 , A 2 , C 2 , and G 2 . Examples appear in Figures 3.2 and 3.3. We then form the distributive lattices of order ideals of these posets. Corollary 5.4 gives elegant quotient-of-products expressions for the rank generating functions of these lattices (thereby providing answers to a 1979 question of Stanley). Also, Theorem 5.3 describes how these lattices provide a new combinatorial setting for the Weyl characters of representations of rank two semisimple Lie algebras. Most of these lattices are new; the rest of them (or related structures) have arisen in work of Stanley, Kashiwara, Nakashima, Littelmann, and Molev. In a future paper, one author shows that the posets constructed here form a Dynkin diagram-indexed answer to a combinatorially posed classification question. In a companion paper, some of these lattices are used to explicitly construct some representations of rank two semisimple Lie algebras. This implies that these lattices are strongly Sperner.

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Analogs of Schur functions for rank two Weyl groups obtained from grid-like posets

Alverson¹,

Donnelly²,

Lewis³

et al. 2019

Preprint

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Distributive Lattices Defined for Representations of Rank Two Semisimple Lie Algebras

Alverson¹,

Donnelly

Lewis

et al. 2009

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The behavior of regular sequences under passage from r to r/i

Pervine

1989

Communications in Algebra

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Robert Pervine

Constructions of representations of o(2n+1,C) that imply Molev and Reiner–Stanton lattices are strongly Sperner

Distributive Lattices Defined for Representations of Rank Two Semisimple Lie Algebras

Analogs of Schur functions for rank two Weyl groups obtained from grid-like posets

Distributive Lattices Defined for Representations of Rank Two Semisimple Lie Algebras

The behavior of regular sequences under passage from r to r/i

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