On-orbit codes of posets and operators in algebra

For a partition μ of a positive integer and a prime p , let A ( p , μ ) be a finite Abelian p -group, and let A ^ ( p , μ ) be its dual group. We define a finite Abelian group as G = ⨁ A ( p , μ ) and its dual as G ^ = ⨁ A ^ ( p , μ ) . In this paper, we explore the symplectic structure associated w...

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Veröffentlicht in:	Journal of algebraic combinatorics Jg. 62; H. 3; S. 44
Hauptverfasser:	Mesnager, Sihem, Raja, Rameez
Format:	Journal Article
Sprache:	Englisch
Veröffentlicht:	New York Springer US 01.11.2025 Springer Nature B.V
Schlagworte:	Algebra Automorphisms Codes Coding theory Combinatorial analysis Combinatorics Computer Science Convex and Discrete Geometry Cryptography Decomposition Error correction & detection Fourier transforms Group theory Group Theory and Generalizations Hilbert space Information theory Lattices Mathematics Mathematics and Statistics Operators (mathematics) Orbits Order Ordered Algebraic Structures Quantum phenomena Quantum physics 05E10 08A35 06A11 Automorphism Orbit Code Poset Hilbert space Representation Finite Abelian Group 81P70
ISSN:	0925-9899, 1572-9192
Online-Zugang:	Volltext
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Zusammenfassung:	For a partition μ of a positive integer and a prime p , let A ( p , μ ) be a finite Abelian p -group, and let A ^ ( p , μ ) be its dual group. We define a finite Abelian group as G = ⨁ A ( p , μ ) and its dual as G ^ = ⨁ A ^ ( p , μ ) . In this paper, we explore the symplectic structure associated with the group Z ( p , μ ) = A ( p , μ ) ⊕ A ^ ( p , μ ) and consider its action on the Hilbert space L 2 ( G ) . We investigate the correspondence between the ideals of a poset, which represent the sizes of bit strings, and the lengths of automorphism orbit code words . We also examine the orbits that result from the action of the symplectic structure on the group Z ( p , μ ) . Additionally, we present a study of μ -based poset orbit codes and the operators of the algebra H o m C ( L 2 ( G ) , L 2 ( G ) ) . This interaction among the order ideals of a poset, μ -based poset orbit codes, group symmetries, and the operators in the algebra H o m C ( L 2 ( G ) , L 2 ( G ) ) bridges the gap between combinatorial coding theory and quantum systems. It also provides practical insights for constructing quantum protocols in the context of modern quantum information theory and cryptography.
Bibliographie:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14
ISSN:	0925-9899 1572-9192
DOI:	10.1007/s10801-025-01469-5