Computation of dilated Kronecker coefficients

Baldoni, Velleda; Vergne, Michèle; Walter, Michael

doi:10.1016/j.jsc.2017.03.005

Cited by 10 publications

(17 citation statements)

References 40 publications

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“…Example 4.10. By (4.11), we have 2, 2, 3 = e (4) 1 ⊗ e (6) 1 ⊗ e (6) 1 + e (4) 1 ⊗ e (6) 2 ⊗ e (6) 3 + e (4) 1 ⊗ e (6) 3 ⊗ e (6) 5 + e (4) 2 ⊗ e (6) 4 ⊗ e (6) 1 + e (4) 2 ⊗ e (6) 5 ⊗ e (6) 3 + e (4) 2 ⊗ e (6) 6 ⊗ e (6) 5 + e (4) 3 ⊗ e (6) 1 ⊗ e (6) 2 + e (4) 3 ⊗ e (6) 2 ⊗ e (6) 4 + e (4) 3 ⊗ e (6) 3 ⊗ e (6) 6 + e (4) 4 ⊗ e (6) 4 ⊗ e (6) 2 + e (4) 4 ⊗ e (6) 5 ⊗ e (6) 4 + e (4) 4 ⊗ e (6) 6 ⊗ e (6) 6 ∈ C 4 ⊗ C 6 ⊗ C 6 . (4.12)…”

Section: For Any Two Diagonalsunclassified

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Two classes of minimal generic fundamental invariants for tensors

Li¹,

Zhang²,

Hanchen³

2021

Preprint

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Motivated by the problems raised by Bürgisser and Ikenmeyer in [15], we discuss two classes of minimal generic fundamental invariants for tensors of order 3. The first one is defined on ⊗ 3 C m , where m = n 2 − 1. We study its construction by obstruction design introduced by Bürgisser and Ikenmeyer, which partially answers one problem raised by them. The second one is defined on C m ⊗ C mn ⊗ C n . We study its evaluation on the matrix multiplication tensor , m, n and unit tensor n 2 when = m = n. The evaluation on the unit tensor leads to the definition of Latin cube and 3-dimensional Alon-Tarsi problem. We generalize some results on Latin square to Latin cube, which enrich the understanding of 3-dimensional Alon-Tarsi problem. It is also natural to generalize the constructions to tensors of other orders. We illustrate the distinction between even and odd dimensional generalizations by concrete examples. Finally, some open problems in related fields are raised. 2020 MSC. Primary 20C15; Secondary 05E10.

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Section: For Any Two Diagonalsunclassified

“…Specially, let 2, 2, 3 I 0 be the triple labeling defined in (4.21). Then we have val H ( 2, 2, 3 I 0 ) = det e (4) 1 , e (4) 2 , e (4) 3 , e (4)…”

mentioning

confidence: 99%

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Two classes of minimal generic fundamental invariants for tensors

Li¹,

Zhang²,

Hanchen³

2021

Preprint

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“…The branching cone. We begin by recalling the branching cone, as described in [5]. Let G be a compact, connected Lie group.…”

Section: Branching and Gelfand-zeitlin Systemsmentioning

confidence: 99%

“…This set is called the branching cone for the subgroup K ≤ G [5]. Since it is a polyhedral cone, C K,G is defined as a subset of t * K × t * G by a finite list of inequalities, (23)…”

Section: Branching and Gelfand-zeitlin Systemsmentioning

confidence: 99%

Convexity and Thimm’s Trick

Lane

2017

Transformation Groups

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Abstract. In this paper we study topological properties of maps constructed by Thimm's trick with Guillemin and Sternberg's action coordinates on a connected Hamiltonian G-manifold M . Since these maps only generate a Hamiltonian torus action on an open dense subset of M , convexity and fibre-connectedness of such maps do not follow immediately from Atiyah-Guillemin-Sternberg's convexity theorem, even if M is compact. The core contribution of this paper is to provide a simple argument circumventing this difficulty.In the case where the map is constructed from a chain of subalgebras we prove that the image is given by a list of inequalities that can be computed explicitly in many examples. This generalizes the fact that the images of the classical Gelfand-Zeitlin systems on coadjoint orbits are Gelfand-Zeitlin polytopes. Moreover, we prove that if such a map generates a completely integrable torus action on an open dense subset of M , then all its fibres are smooth embedded submanifolds.

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Multivariate Series and Diagonals

Melczer

2020

Algorithmic and Symbolic Combinatorics

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Computation of dilated Kronecker coefficients

Cited by 10 publications

References 40 publications

Two classes of minimal generic fundamental invariants for tensors

Two classes of minimal generic fundamental invariants for tensors

Convexity and Thimm’s Trick

Multivariate Series and Diagonals

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