Two Partial Orders for Standard Young Tableaux

Kosakowska, Justyna; Schmidmeier, Markus; Thomas, Hugh

doi:10.37236/5967

Cited by 3 publications

(17 citation statements)

References 6 publications

(15 reference statements)

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“…This completes the proof of Theorem 1.2. Using results given in [13] and in [14], we show part (b) of Theorem 1.3 and complete the proof of Theorem 1.5.…”

Section: Organization Of This Papermentioning

confidence: 52%

“…In this situation, the combinatorial relations ≤ box and ≤ dom are in fact equivalent. In [14] we give two proofs for this statement; below in Section 2.1 we sketch the algorithmic approach in one of them. We deduce the following result.…”

Section: Horizontal and Vertical Stripsmentioning

confidence: 99%

“…However for horizontal and vertical strips, the two partial orders are equivalent [14]: Theorem 2.2. Suppose α, β, γ are partitions such that β \ γ is a horizontal and vertical strip.…”

Section: Notation: One Can Represent An Lr-tableau γ By a Sequence Of...mentioning

confidence: 99%

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The boundary of the irreducible components for invariant subspace varieties

Kosakowska

Schmidmeier

2018

Math. Z.

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Given partitions α, β, γ, the short exact sequences 0 −→ Nα −→ N β −→ Nγ −→ 0 of nilpotent linear operators of Jordan types α, β, γ, respectively, define a constructible subset V β α,γ of an affine variety. Geometrically, the varieties V β α,γ are of particular interest as they occur naturally and since they typically consist of several irreducible components. In fact, each Littlewood-Richardson tableau Γ of shape (α, β, γ) contributes one irreducible component V Γ . We consider the partial order Γ ≤ boundary Γ on LR-tableaux which is the transitive closure of the relation given by V Γ ∩ V Γ = ∅. In this paper we compare the boundary relation with partial orders given by algebraic, combinatorial and geometric conditions. It is known that in the case where the parts of α are at most two, all those partial orders are equivalent. We prove that those partial orders are also equivalent in the case where β \ γ is a horizontal and vertical strip. Moreover, we discuss how the orders differ in general.MSC 2010: 14L30, 16G20, 47A15.

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“…This completes the proof of Theorem 1.2. Using results given in [13] and in [14], we show part (b) of Theorem 1.3 and complete the proof of Theorem 1.5.…”

Section: Organization Of This Papermentioning

confidence: 52%

Section: Horizontal and Vertical Stripsmentioning

confidence: 99%

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The boundary of the irreducible components for invariant subspace varieties

Kosakowska

Schmidmeier

2018

Math. Z.

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“…In case the skew diagram β \ γ is a horizontal and vertical strip, the dominance relation is generated by the increasing box moves ( [8]). As a consequence we can describe the relation ≤ boundary : Corollary 5.3 (Corollary 1.2).…”

Section: The Boundary Relation For Invariant Subspace Varietiesmentioning

confidence: 99%

“…In general, the poset P boundary may be difficult to determine. If, however, the shape β \ γ of the LR-tableaux is a horizontal and vertical strip then it turns out that any two tableaux in dominance partial order can be transformed into each other by using increasing box moves [8], see Section 2.2 for definitions.…”

Section: Introductionmentioning

confidence: 99%

Box moves on Littlewood–Richardson tableaux and an application to invariant subspace varieties

Kosakowska

Schmidmeier

2017

Journal of Algebra

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In his 1951 book "Infinite Abelian Groups", Kaplansky gives a combinatorial characterization of the isomorphism types of embeddings of a cyclic subgroup in a finite abelian group. In this paper we first use partial maps on Littlewood-Richardson tableaux to generalize this result to finite direct sums of such embeddings. We then focus on an application to invariant subspaces of nilpotent linear operators. We develop a criterion to decide if two irreducible components in the representation space are in the boundary partial order.

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