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Main Author: Duplij, Steven
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2403.19361
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author Duplij, Steven
author_facet Duplij, Steven
contents We generalize $σ$-matrices to higher arities using the polyadization procedure proposed by the author. We build the nonderived $n$-ary version of $SU\left( 2\right) $ using cyclic shift block matrices. We define a new function, the polyadic trace, which has an additivity property analogous to the ordinary trace for block diagonal matrices and which can be used to build the corresponding invariants. The elementary $Σ$-matrices introduced here play a role similar to ordinary matrix units, and their sums are full $Σ$-matrices which can be treated as a polyadic analog of $σ$-matrices. The presentation of $n$-ary $SU\left( 2\right) $ in terms of full $Σ$-matrices is done using the Hadamard product. We then generalize the Pauli group in two ways: for the binary case we introduce the extended phase shifted $σ$-matrices with multipliers in cyclic groups of order $4q$ ($q>4$), and for the polyadic case we construct the correspondent finite $n$-ary semigroup of phase-shifted elementary $Σ$-matrices of order $4q\left( n-1\right) +1$, and the finite $n$-ary group of phase-shifted full $Σ$-matrices of order $4q$. Finally, we introduce the finite $n$-ary group of heterogeneous full $\mathitΣ^{het}$-matrices of order $\left( 4q\left( n-1\right) \right) ^{4}$. Some examples of the lowest arities are presented.
format Preprint
id arxiv_https___arxiv_org_abs_2403_19361
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Polyadic sigma matrices
Duplij, Steven
Group Theory
High Energy Physics - Phenomenology
High Energy Physics - Theory
Mathematical Physics
Quantum Physics
20B05, 20H20, 20N10, 20N15, 20M10
We generalize $σ$-matrices to higher arities using the polyadization procedure proposed by the author. We build the nonderived $n$-ary version of $SU\left( 2\right) $ using cyclic shift block matrices. We define a new function, the polyadic trace, which has an additivity property analogous to the ordinary trace for block diagonal matrices and which can be used to build the corresponding invariants. The elementary $Σ$-matrices introduced here play a role similar to ordinary matrix units, and their sums are full $Σ$-matrices which can be treated as a polyadic analog of $σ$-matrices. The presentation of $n$-ary $SU\left( 2\right) $ in terms of full $Σ$-matrices is done using the Hadamard product. We then generalize the Pauli group in two ways: for the binary case we introduce the extended phase shifted $σ$-matrices with multipliers in cyclic groups of order $4q$ ($q>4$), and for the polyadic case we construct the correspondent finite $n$-ary semigroup of phase-shifted elementary $Σ$-matrices of order $4q\left( n-1\right) +1$, and the finite $n$-ary group of phase-shifted full $Σ$-matrices of order $4q$. Finally, we introduce the finite $n$-ary group of heterogeneous full $\mathitΣ^{het}$-matrices of order $\left( 4q\left( n-1\right) \right) ^{4}$. Some examples of the lowest arities are presented.
title Polyadic sigma matrices
topic Group Theory
High Energy Physics - Phenomenology
High Energy Physics - Theory
Mathematical Physics
Quantum Physics
20B05, 20H20, 20N10, 20N15, 20M10
url https://arxiv.org/abs/2403.19361