SEMIDIRECT PRODUCTS OF ORDERED SEMIGROUPS
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Publication:4531139
DOI10.1081/AGB-120006484zbMath1003.06009OpenAlexW2102775730MaRDI QIDQ4531139
Publication date: 30 January 2003
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1081/agb-120006484
decompositionwreath productssemidirect productsinverse monoidsordered monoidsordered semigroupsordered block-groups
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Shuffle on positive varieties of languages ⋮ Pseudovarieties defining classes of sofic subshifts closed under taking shift equivalent subshifts. ⋮ The half-levels of the \(\mathrm {FO}_2\) alternation hierarchy ⋮ Regular languages and partial commutations ⋮ Upper set monoids and length preserving morphisms ⋮ Quiver approach to some ordered semigroup algebras ⋮ Some results onC-varieties ⋮ A Robust Class of Regular Languages ⋮ Schreier split extensions of preordered monoids ⋮ One quantifier alternation in first-order logic with modular predicates ⋮ Algebraic tools for the concatenation product.
Cites Work
- Unnamed Item
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- Inverse semigroups and varieties of finite semigroups
- Categories as algebra: An essential ingredient in the theory of monoids
- Partially ordered finite monoids and a theorem of I. Simon
- Semidirect products of categories and applications
- Varieties and pseudovarieties of ordered normal bands
- Polynomial closure of group languages and open sets of the Hall topology
- Profinite categories and semidirect products
- A Reiterman theorem for pseudovarieties of finite first-order structures
- Profinite semigroups, Mal'cev products, and identities
- On finitely based pseudovarieties of the forms \({\mathbf V}*{\mathbf D}\) and \({\mathbf V}*{\mathbf D}_n\)
- INEVITABLE GRAPHS: A PROOF OF THE TYPE II CONJECTURE AND SOME RELATED DECISION PROCEDURES
- ASH'S TYPE II THEOREM, PROFINITE TOPOLOGY AND MALCEV PRODUCTS: PART I
- POLYNOMIAL CLOSURE AND TOPOLOGY
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