Four-spiral semigroup

In mathematics, the four-spiral semigroup is a special semigroup generated by four idempotent elements. This special semigroup was first studied by Karl Byleen in a doctoral dissertation submitted to the University of Nebraska in 1977.[1][2] It has several interesting properties: it is one of the most important examples of bi-simple but not completely-simple semigroups;[3] it is also an important example of a fundamental regular semigroup;[2] it is an indispensable building block of bisimple, idempotent-generated regular semigroups.[2] A certain semigroup, called double four-spiral semigroup, generated by five idempotent elements has also been studied along with the four-spiral semigroup.[4][2]

Definition

The four-spiral semigroup, denoted by Sp4, is the free semigroup generated by four elements a, b, c, and d satisfying the following eleven conditions:[2]

  • a2 = a, b2 = b, c2 = c, d2 = d.
  • ab = b, ba = a, bc = b, cb = c, cd = d, dc = c.
  • da = d.

The first set of conditions imply that the elements a, b, c, d are idempotents. The second set of conditions imply that a R b L c R d where R and L are the Green's relations in a semigroup. The lone condition in the third set can be written as d ωl a, where ωl is a biorder relation defined by Nambooripad. The diagram below summarises the various relations among a, b, c, d:

Elements of the four-spiral semigroup

The spiral structure of idempotents in the four-spiral semigroup Sp4. In this diagram, elements in the same row are R-related, elements in the same column are L-related, and the order proceeds down the four diagonals (away from the center).
The structure of the four-spiral semigroup Sp4. The set of idempotents (red coloured points) and the subsemigroups A, B, C, D, E are shown.[4]

General elements

Every element of Sp4 can be written uniquely in one of the following forms:[2]

[c] (ac)m [a]
[d] (bd)n [b]
[c] (ac)m ad (bd)n [b]

where m and n are non-negative integers and terms in square brackets may be omitted as long as the remaining product is not empty. The forms of these elements imply that Sp4 has a partition Sp4 = A B C D E where

A = { a(ca)n, (bd)n+1, a(ca)md(bd)n  : m, n non-negative integers }
B = { (ac)n+1, b(db)n, a(ca)m(db) n+1  : m, n non-negative integers }
C = { c(ac)m, (db)n+1, (ca)m+1(db)n+1 : m, n non-negative integers }
D = { d(bd)n, (ca)m+1(db)n+1d  : m, n non-negative integers }
E = { (ca)m  : m positive integer }

The sets A, B, C, D are bicyclic semigroups, E is an infinite cyclic semigroup and the subsemigroup D E is a nonregular semigroup.

Idempotent elements

The set of idempotents of Sp4,[5] is {an, bn, cn, dn : n = 0, 1, 2 ,...} where, a0 = a, b0 = b, c0 = c, d0 = d, and for n = 0, 1, 2 ,....,

an+1 = a(ca)n(db)nd
bn+1 = a(ca)n(db)n+1
cn+1 = (ca)n+1(db)n+1
dn+1 = (ca)n+1(db)n+ld

The sets of idempotents in the subsemigroups A, B, C, D (there are no idempotents in the subsemigoup E) are respectively:

EA = { an : n = 0,1,2, ... }
EB = { bn : n = 0,1,2, ... }
EC = { cn : n = 0,1,2, ... }
ED = { dn : n = 0,1,2, ... }

Four-spiral semigroup as a Rees-matrix semigroup

Let S be the set of all quadruples (r, x, y, s) where r, s, { 0, 1 } and x and y are nonnegative integers and define a binary operation in S by



The set S with this operation is a Rees matrix semigroup over the bicyclic semigroup, and the four-spiral semigroup Sp4 is isomorphic to S.[2]

Properties

Double four-spiral semigroup

The fundamental double four-spiral semigroup, denoted by DSp4, is the semigroup generated by five elements a, b, c, d, e satisfying the following conditions:[2][4]

  • a2 = a, b2 = b, c2 = c, d2 = d, e2 = e
  • ab = b, ba = a, bc = b, cb = c, cd = d, dc = c, de = d, ed = e
  • ae = e, ea = e

The first set of conditions imply that the elements a, b, c, d, e are idempotents. The second set of conditions state the Green's relations among these idempotents, namely, a R b L c R d L e. The two conditions in the third set imply that e ω a where ω is the biorder relation defined as ω = ωl ωr.

References

  1. Byleen, K. (1977). The Structure of Regular and Inverse Semigroups, Doctoral Dissertation. University of Nebraska.
  2. 1 2 3 4 5 6 7 8 Pierre Antoine Grillet (1996). "On the fundamental double four-spiral semigroup". Bulletin of the Belgian Mathematical Society. 3: 201 208.
  3. L.N. Shevrin (originator). "Simple semi-group". Encyclopedia of Mathematics. Retrieved 25 January 2014.
  4. 1 2 3 Meakin, John; K. Byleen; F. Pastijn (1980). "The double four-spiral semigroup". Simon Stevin. 54: 75 & minus 105.
  5. Karl Byleen; John Meakin; Francis Pastjin (1978). "The Fundamental Four-Spiral Semigroup". Journal of Algebra. 54: 6 26. doi:10.1016/0021-8693(78)90018-2.
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