In mathematics, a regular semigroup is a semigroup S in which every element is regular, i.e., for each element a in S there exists an element x in S such that axa = a.[1] Regular semigroups are one of the most-studied classes of semigroups, and their structure is particularly amenable to study via Green's relations.[2]
History
Regular semigroups were introduced by J. A. Green in his influential 1951 paper "On the structure of semigroups"; this was also the paper in which Green's relations were introduced. The concept of regularity in a semigroup was adapted from an analogous condition for rings, already considered by John von Neumann.[3] It was Green's study of regular semigroups which led him to define his celebrated relations. According to a footnote in Green 1951, the suggestion that the notion of regularity be applied to semigroups was first made by David Rees.
The term inversive semigroup (French: demi-groupe inversif) was historically used as synonym in the papers of Gabriel Thierrin (a student of Paul Dubreil) in the 1950s,[4][5] and it is still used occasionally.[6]
The basics
There are two equivalent ways in which to define a regular semigroup S:
- (1) for each a in S, there is an x in S, which is called a pseudoinverse,[7] with axa = a;
- (2) every element a has at least one inverse b, in the sense that aba = a and bab = b.
To see the equivalence of these definitions, first suppose that S is defined by (2). Then b serves as the required x in (1). Conversely, if S is defined by (1), then xax is an inverse for a, since a(xax)a = axa(xa) = axa = a and (xax)a(xax) = x(axa)(xax) = xa(xax) = x(axa)x = xax.[8]
The set of inverses (in the above sense) of an element a in an arbitrary semigroup S is denoted by V(a).[9] Thus, another way of expressing definition (2) above is to say that in a regular semigroup, V(a) is nonempty, for every a in S. The product of any element a with any b in V(a) is always idempotent: abab = ab, since aba = a.[10]
Examples of regular semigroups
- Every group is a regular semigroup.
- Every band (idempotent semigroup) is regular in the sense of this article, though this is not what is meant by a regular band.
- The bicyclic semigroup is regular.
- Any full transformation semigroup is regular.
- A Rees matrix semigroup is regular.
- The homomorphic image of a regular semigroup is regular.[11]
Unique inverses and unique pseudoinverses
A regular semigroup in which idempotents commute (with idempotents) is an inverse semigroup, or equivalently, every element has a unique inverse. To see this, let S be a regular semigroup in which idempotents commute. Then every element of S has at least one inverse. Suppose that a in S has two inverses b and c, i.e.,
- aba = a, bab = b, aca = a and cac = c. Also ab, ba, ac and ca are idempotents as above.
Then
- b = bab = b(aca)b = bac(a)b = bac(aca)b = bac(ac)(ab) = bac(ab)(ac) = ba(ca)bac = ca(ba)bac = c(aba)bac = cabac = cac = c.
So, by commuting the pairs of idempotents ab & ac and ba & ca, the inverse of a is shown to be unique. Conversely, it can be shown that any inverse semigroup is a regular semigroup in which idempotents commute.[12]
The existence of a unique pseudoinverse implies the existence of a unique inverse, but the opposite is not true. For example, in the symmetric inverse semigroup, the empty transformation Ø does not have a unique pseudoinverse, because Ø = ØfØ for any transformation f. The inverse of Ø is unique however, because only one f satisfies the additional constraint that f = fØf, namely f = Ø. This remark holds more generally in any semigroup with zero. Furthermore, if every element has a unique pseudoinverse, then the semigroup is a group, and the unique pseudoinverse of an element coincides with the group inverse.
Green's relations
Recall that the principal ideals of a semigroup S are defined in terms of S1, the semigroup with identity adjoined; this is to ensure that an element a belongs to the principal right, left and two-sided ideals which it generates. In a regular semigroup S, however, an element a = axa automatically belongs to these ideals, without recourse to adjoining an identity. Green's relations can therefore be redefined for regular semigroups as follows:
- if, and only if, Sa = Sb;
- if, and only if, aS = bS;
- if, and only if, SaS = SbS.[13]
In a regular semigroup S, every - and -class contains at least one idempotent. If a is any element of S and a' is any inverse for a, then a is -related to a'a and -related to aa'.[14]
Theorem. Let S be a regular semigroup; let a and b be elements of S, and let V(x) denote the set of inverses of x in S. Then
- iff there exist a' in V(a) and b' in V(b) such that a'a = b'b;
- iff there exist a' in V(a) and b' in V(b) such that aa' = bb',
- iff there exist a' in V(a) and b' in V(b) such that a'a = b'b and aa' = bb'.[15]
If S is an inverse semigroup, then the idempotent in each - and -class is unique.[12]
Special classes of regular semigroups
Some special classes of regular semigroups are:[16]
- Locally inverse semigroups: a regular semigroup S is locally inverse if eSe is an inverse semigroup, for each idempotent e.
- Orthodox semigroups: a regular semigroup S is orthodox if its subset of idempotents forms a subsemigroup.
- Generalised inverse semigroups: a regular semigroup S is called a generalised inverse semigroup if its idempotents form a normal band, i.e., xyzx = xzyx for all idempotents x, y, z.
The class of generalised inverse semigroups is the intersection of the class of locally inverse semigroups and the class of orthodox semigroups.[17]
All inverse semigroups are orthodox and locally inverse. The converse statements do not hold.
Generalizations
See also
References
- ↑ Howie 1995 p. 54
- ↑ Howie 2002.
- ↑ von Neumann 1936.
- ↑ Christopher Hollings (16 July 2014). Mathematics across the Iron Curtain: A History of the Algebraic Theory of Semigroups. American Mathematical Society. p. 181. ISBN 978-1-4704-1493-1.
- ↑ "Publications". www.csd.uwo.ca. Archived from the original on 1999-11-04.
- ↑ Jonathan S. Golan (1999). Power Algebras over Semirings: With Applications in Mathematics and Computer Science. Springer Science & Business Media. p. 104. ISBN 978-0-7923-5834-3.
- ↑ Klip, Knauer and Mikhalev : p. 33
- ↑ Clifford & Preston 2010 Lemma 1.14.
- ↑ Howie 1995 p. 52
- ↑ Clifford & Preston 2010 p. 26
- ↑ Howie 1995 Lemma 2.4.4
- 1 2 Howie 1995 Theorem 5.1.1
- ↑ Howie 1995 p. 55
- ↑ Clifford & Preston 2010 Lemma 1.13
- ↑ Howie 1995 Proposition 2.4.1
- ↑ Howie 1995 ch. 6, § 2.4
- ↑ Howie 1995 p. 222
Sources
- Clifford, Alfred Hoblitzelle; Preston, Gordon Bamford (2010) [1967]. The algebraic theory of semigroups. Vol. 2. American Mathematical Society. ISBN 978-0-8218-0272-4.
- Howie, John Mackintosh (1995). Fundamentals of Semigroup Theory (1st ed.). Clarendon Press. ISBN 978-0-19-851194-6.
- M. Kilp, U. Knauer, A.V. Mikhalev, Monoids, Acts and Categories with Applications to Wreath Products and Graphs, De Gruyter Expositions in Mathematics vol. 29, Walter de Gruyter, 2000, ISBN 3-11-015248-7.
- J. A. Green (1951). "On the structure of semigroups". Annals of Mathematics. Second Series. 54 (1): 163–172. doi:10.2307/1969317. hdl:10338.dmlcz/100067. JSTOR 1969317.
- J. M. Howie, Semigroups, past, present and future, Proceedings of the International Conference on Algebra and Its Applications, 2002, 6–20.
- J. von Neumann (1936). "On regular rings". Proceedings of the National Academy of Sciences of the USA. 22 (12): 707–713. Bibcode:1936PNAS...22..707V. doi:10.1073/pnas.22.12.707. PMC 1076849. PMID 16577757.