Linear Immanant Converters on Skew-Symmetric Matrices of Order 4

A. E. Guterman; M. A. Duffner; I. A. Spiridonov

doi:10.1007/s10958-021-05366-7

Linear Immanant Converters on Skew-Symmetric Matrices of Order 4

A. E. Guterman, M. A. Duffner, I. A. Spiridonov

Research output: Contribution to journal › Article › peer-review

Abstract

Let Qn denote the space of all n × n skew-symmetric matrices over the complex field ℂ. It is proved that for n = 4, there are no linear maps T : Q₄ → Q₄ satisfying the condition d_χ' (T (A)) = d_χ(A) for all matrices A ∈ Q₄, where χ, χ' ∈ {1, ∈, [2, 2]} are two distinct irreducible characters of S₄. In the case χ = χ' = 1, a complete characterization of the linear maps T : Q₄ → Q₄ preserving the permanent is obtained. This case is the only one corresponding to equal characters and remaining uninvestigated so far.

Original language	English
Pages (from-to)	242-253
Number of pages	12
Journal	Journal of Mathematical Sciences
Volume	255
Issue number	3
DOIs	https://doi.org/10.1007/s10958-021-05366-7
State	Published - Jun 2021
Externally published	Yes

All Science Journal Classification (ASJC) codes

Statistics and Probability
General Mathematics
Applied Mathematics

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title = "Linear Immanant Converters on Skew-Symmetric Matrices of Order 4",

abstract = "Let Qn denote the space of all n × n skew-symmetric matrices over the complex field ℂ. It is proved that for n = 4, there are no linear maps T : Q4 → Q4 satisfying the condition dχ' (T (A)) = dχ(A) for all matrices A ∈ Q4, where χ, χ' ∈ \{1, ∈, [2, 2]\} are two distinct irreducible characters of S4. In the case χ = χ' = 1, a complete characterization of the linear maps T : Q4 → Q4 preserving the permanent is obtained. This case is the only one corresponding to equal characters and remaining uninvestigated so far.",

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AU - Guterman, A. E.

AU - Duffner, M. A.

AU - Spiridonov, I. A.

PY - 2021/6

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N2 - Let Qn denote the space of all n × n skew-symmetric matrices over the complex field ℂ. It is proved that for n = 4, there are no linear maps T : Q4 → Q4 satisfying the condition dχ' (T (A)) = dχ(A) for all matrices A ∈ Q4, where χ, χ' ∈ {1, ∈, [2, 2]} are two distinct irreducible characters of S4. In the case χ = χ' = 1, a complete characterization of the linear maps T : Q4 → Q4 preserving the permanent is obtained. This case is the only one corresponding to equal characters and remaining uninvestigated so far.

AB - Let Qn denote the space of all n × n skew-symmetric matrices over the complex field ℂ. It is proved that for n = 4, there are no linear maps T : Q4 → Q4 satisfying the condition dχ' (T (A)) = dχ(A) for all matrices A ∈ Q4, where χ, χ' ∈ {1, ∈, [2, 2]} are two distinct irreducible characters of S4. In the case χ = χ' = 1, a complete characterization of the linear maps T : Q4 → Q4 preserving the permanent is obtained. This case is the only one corresponding to equal characters and remaining uninvestigated so far.

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JO - Journal of Mathematical Sciences

JF - Journal of Mathematical Sciences

IS - 3

ER -

Linear Immanant Converters on Skew-Symmetric Matrices of Order 4

Abstract

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