Finite Semigroups

Equations in finite semigroups: explicit enumeration and asymptotics of solution numbers

Journal of Combinatorial Theory Series A ◽

10.1016/j.jcta.2003.12.001 ◽

2004 ◽

Vol 105 (2) ◽

pp. 291-334

Author(s):

C. Krattenthaler ◽

T.W. Müller

Keyword(s):

Finite Semigroups ◽

Asymptotics Of Solution ◽

Explicit Enumeration

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Complete classification of finite semigroups for which the inverse monoid of local automorphisms is a $$\varDelta $$-semigroup

Semigroup Forum ◽

10.1007/s00233-020-10159-6 ◽

2021 ◽

Author(s):

V. D. Derech

Keyword(s):

Complete Classification ◽

Inverse Monoid ◽

Finite Semigroups

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Construction of an effective algorithm to find the isomorphism of two simple finite semigroups

Cybernetics ◽

10.1007/bf01068686 ◽

1987 ◽

Vol 22 (6) ◽

pp. 706-714

Author(s):

V. A. Makarenko

Keyword(s):

Effective Algorithm ◽

Finite Semigroups

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Finite semigroups in βN and Ramsey theory

Bulletin of the London Mathematical Society ◽

10.1112/blms.12453 ◽

2021 ◽

Author(s):

Yevhen Zelenyuk

Keyword(s):

Ramsey Theory ◽

Finite Semigroups

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Finite semigroups embed in finitely presented congruence-free monoids

Journal of Algebra ◽

10.1016/j.jalgebra.2013.05.015 ◽

2013 ◽

Vol 389 ◽

pp. 1-5 ◽

Cited By ~ 2

Author(s):

Victor Maltcev

Keyword(s):

Free Monoids ◽

Finite Semigroups ◽

Finitely Presented

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Undecidability of the identity problem for finite semigroups

Journal of Symbolic Logic ◽

10.2307/2275184 ◽

1992 ◽

Vol 57 (1) ◽

pp. 179-192 ◽

Cited By ~ 33

Author(s):

Douglas Albert ◽

Robert Baldinger ◽

John Rhodes

Keyword(s):

Word Problem ◽

Finite Semigroup ◽

Identity Problem ◽

Finite Semigroups ◽

Or Groups ◽

Finite Set ◽

Variety Of Semigroups ◽

Finite Products

In 1947 E. Post [28] and A. A. Markov [18] independently proved the undecidability of the word problem (or the problem of deducibility of relations) for semigroups. In 1968 V. L. Murskil [23] proved the undecidability of the identity problem (or the problem of deducibility of identities) in semigroups.If we slightly generalize the statement of these results we can state many related results in the literature and state our new results proved here. Let V denote either a (Birkhoff) variety of semigroups or groups or a pseudovariety of finite semigroups. By a very well-known theorem a (Birkhoff) variety is defined by equations or equivalently closed under substructure, surmorphisms and all products; see [7]. It is also well known that V is a pseudovariety of finite semigroups iff V is closed under substructure, surmorphism and finite products, or, equivalently, determined eventually by equations w1 = w1′, w2 = w2′, w3 = w3′,… (where the finite semigroup S eventually satisfies these equations iff there exists an n, depending on S, such that S satisfies Wj = Wj′ for j ≥ n). See [8] and [29]. All semigroups form a variety while all finite semigroups form a pseudovariety.We now consider a table (see the next page). In it, for example, the box denoting the “word” (identity) problem for the psuedovariety V” means, given a finite set of relations (identities) E and a relation (identity) u = ν, the problem of whether it is decidable that E implies u = ν inside V.

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