Symmetric bilinear forms, superalgebras and integer matrix factorization

Dan Fretwell; Jenny Roberts

doi:10.1016/j.laa.2024.07.017

Symmetric bilinear forms, superalgebras and integer matrix factorization

Dan Fretwell, Jenny Roberts

Research output: Contribution to journal › Article (Academic Journal) › peer-review

Abstract

We construct and investigate certain (unbalanced) superalgebra structures on $\text{End}_K(V)$, with $K$ a field of characteristic $0$ and $V$ a finite dimensional $K$-vector space (of dimension $n\geq 2$). These structures are induced by a choice of non-degenerate symmetric bilinear form $B$ on $V$ and a choice of non-zero base vector $w\in V$. After exploring the construction further, we apply our results to certain questions concerning integer matrix factorization and isometry of integral lattices.

Original language	English
Pages (from-to)	61-79
Number of pages	19
Journal	Linear Algebra and Its Applications
Volume	700
Early online date	25 Jul 2024
DOIs	https://doi.org/10.1016/j.laa.2024.07.017
Publication status	Published - 1 Nov 2024

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© 2024 The Author(s)

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math.RA

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title = "Symmetric bilinear forms, superalgebras and integer matrix factorization",

abstract = "We construct and investigate certain (unbalanced) superalgebra structures on \$\textbackslash{}text\{End\}\_K(V)\$, with \$K\$ a field of characteristic \$0\$ and \$V\$ a finite dimensional \$K\$-vector space (of dimension \$n\textbackslash{}geq 2\$). These structures are induced by a choice of non-degenerate symmetric bilinear form \$B\$ on \$V\$ and a choice of non-zero base vector \$w\textbackslash{}in V\$. After exploring the construction further, we apply our results to certain questions concerning integer matrix factorization and isometry of integral lattices.",

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N2 - We construct and investigate certain (unbalanced) superalgebra structures on $\text{End}_K(V)$, with $K$ a field of characteristic $0$ and $V$ a finite dimensional $K$-vector space (of dimension $n\geq 2$). These structures are induced by a choice of non-degenerate symmetric bilinear form $B$ on $V$ and a choice of non-zero base vector $w\in V$. After exploring the construction further, we apply our results to certain questions concerning integer matrix factorization and isometry of integral lattices.

AB - We construct and investigate certain (unbalanced) superalgebra structures on $\text{End}_K(V)$, with $K$ a field of characteristic $0$ and $V$ a finite dimensional $K$-vector space (of dimension $n\geq 2$). These structures are induced by a choice of non-degenerate symmetric bilinear form $B$ on $V$ and a choice of non-zero base vector $w\in V$. After exploring the construction further, we apply our results to certain questions concerning integer matrix factorization and isometry of integral lattices.

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U2 - 10.1016/j.laa.2024.07.017

DO - 10.1016/j.laa.2024.07.017

M3 - Article (Academic Journal)

SN - 0024-3795

VL - 700

SP - 61

EP - 79

JO - Linear Algebra and Its Applications

JF - Linear Algebra and Its Applications

ER -

Symmetric bilinear forms, superalgebras and integer matrix factorization

Abstract

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