A Structure Theorem of Regular ${\cal H}^\sharp$-Cryptographs
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Publication:3597576
DOI10.1142/S100538670800062XzbMath1168.20027OpenAlexW2175033818MaRDI QIDQ3597576
Zhiling Yuan, Xiang-Zhi Kong, Kar Ping Shum
Publication date: 9 February 2009
Published in: Algebra Colloquium (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s100538670800062x
idempotentsabundant semigroupsgeneralized Green relationssuperabundant semigroupssemiabundant semigroupsstrong semilattices of completely simple semigroupsregular cryptographs
Related Items (2)
GREEN ♯-RELATIONS AND NORMAL ${\cal H}^\sharp$-CRYPTOGROUPS ⋮ $\widetilde{\cal H}$-Supercryptogroups Having Regular Band Congruence
Cites Work
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- A representation of a semigroup by a semigroup of matrices over a group with zero
- The structure of superabundant semigroups.
- Semigroups admitting relative inverses
- ON THE STRUCTURE OF REGULAR CRYPTO SEMIGROUPS
- Completely Regular Semigroups with Generalized Strong Semilattice Decompositions
- On Superabundant Semigroups Whose Set of Idempotents Forms a Subsemigroup
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