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zero elements (Definition)

Let $ S$ be a semigroup. An element $ z$ is called a right zero [resp. left zero] if $ xz = z$ [resp. $ zx = z$] for all $ x \in S$.

An element which is both a left and a right zero is called a zero element.

A semigroup may have many left zeros or right zeros, but if it has at least one of each, then they are necessarily equal, giving a unique (two-sided) zero element.

It is customary to use the symbol $ \theta$ for the zero element of a semigroup.



"zero elements" is owned by mclase.
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See Also: semigroup, null semigroup, absorbing element

Also defines:  zero, zero element, right zero, left zero
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Cross-references: right, semigroup
There are 19 references to this entry.

This is version 1 of zero elements, born on 2002-09-07.
Object id is 3440, canonical name is ZeroElements.
Accessed 10730 times total.

Classification:
AMS MSC20M99 (Group theory and generalizations :: Semigroups :: Miscellaneous)
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