Difference between revisions of "Multiplicative semi-group"
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''of an associative ring'' | ''of an associative ring'' | ||
| − | The [[ | + | The [[semi-group]] formed by the elements of the given associative ring relative to multiplication. In a unital ring (ring with multiplicative identity) this is a [[monoid]]. A non-associative ring is, relative to multiplication, only a [[magma]]; it is called the multiplicative system of the ring. |
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| + | Some properties of a ring can be expressed in terms of the multiplicative semigroup. For example, a [[factorial ring]] is one with a multiplicative [[Gauss semi-group]]. | ||
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| + | ''of a general magma'' | ||
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| + | If $M$ is a [[magma]] with a [[binary operation]] written $\cdot$ then the left and right multiplication operators are the maps from $M$ to itself defined by $L_x :y \mapsto x \cdot y$ and $R_x : y \mapsto y \cdot x$. The multiplicative or multiplication semigroup of $(M,{\cdot})$ is the semigroup generated by the operators $L_x$ and $R_x$ within the semigroup of all maps from $M$ to itself. | ||
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| + | Properties of the magma $M$ are reflected in those of its multiplication semigroup. For example, the [[flexible identity]] is equivalent to each pair $L_x$, $R_x$ commuting; and [[associativity]] to all $L_x$ commuting with all $R_y$; $M$ is a [[quasi-group]] if each of the left and right multiplication operators is a permutation. | ||
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| + | ====References==== | ||
| + | <table> | ||
| + | <TR><TD valign="top">[a1]</TD> <TD valign="top"> R.H. Bruck, "A survey of binary systems" Ergebnisse der Mathematik und ihrer Grenzgebiete. Neue Folge. '''20''' Springer (1958) {{ZBL|0081.01704}}</TD></TR> | ||
| + | </table> | ||
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| + | {{TEX|done}} | ||
Latest revision as of 21:22, 7 January 2016
of an associative ring
The semi-group formed by the elements of the given associative ring relative to multiplication. In a unital ring (ring with multiplicative identity) this is a monoid. A non-associative ring is, relative to multiplication, only a magma; it is called the multiplicative system of the ring.
Some properties of a ring can be expressed in terms of the multiplicative semigroup. For example, a factorial ring is one with a multiplicative Gauss semi-group.
of a general magma
If $M$ is a magma with a binary operation written $\cdot$ then the left and right multiplication operators are the maps from $M$ to itself defined by $L_x :y \mapsto x \cdot y$ and $R_x : y \mapsto y \cdot x$. The multiplicative or multiplication semigroup of $(M,{\cdot})$ is the semigroup generated by the operators $L_x$ and $R_x$ within the semigroup of all maps from $M$ to itself.
Properties of the magma $M$ are reflected in those of its multiplication semigroup. For example, the flexible identity is equivalent to each pair $L_x$, $R_x$ commuting; and associativity to all $L_x$ commuting with all $R_y$; $M$ is a quasi-group if each of the left and right multiplication operators is a permutation.
References
| [a1] | R.H. Bruck, "A survey of binary systems" Ergebnisse der Mathematik und ihrer Grenzgebiete. Neue Folge. 20 Springer (1958) Zbl 0081.01704 |
Multiplicative semi-group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Multiplicative_semi-group&oldid=13440