Difference between revisions of "Semi-lattice"
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+ | A commutative idempotent [[semi-group]], that is, a semi-group satisfying the identities $x+y=y+x$ and $x+x=x$. Every semi-lattice $p=\langle p,+\rangle$ can be turned into a [[partially ordered set]] (the partial order $\leq$ is defined by the relation $a\leq b$ if and only if $a+b=b$) in which for any pair of elements there is a least upper bound $\sup\{a,b\}=a+b$. Conversely, every partially ordered set with least upper bounds for every pair of elements is a semi-lattice with respect to the operation $a+b=\sup\{a,b\}$. In this case one says that the partially ordered set is an upper semi-lattice (or a join semi-lattice, or a $\vee$-semi-lattice). A lower semi-lattice, also called a meet semi-lattice or a $\wedge$-semi-lattice, is dually defined as a partially ordered set in which any two elements have a greatest lower bound. | ||
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+ | ====Comments==== | ||
+ | A band is a semi-group every element of which is idempotent (cf. also [[Band of semi-groups]]) (which is a decomposition of a semi-group into sub-semi-groups forming a band). Thus, an upper (lower) semi-lattice defines a commutative band, and conversely. | ||
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+ | ====References==== | ||
+ | <table> | ||
+ | <TR><TD valign="top">[a1]</TD> <TD valign="top"> A.H. Clifford, G.B. Preston, "The algebraic theory of semigroups" , '''1''' , Amer. Math. Soc. (1961) pp. §1.8 {{ZBL|0111.03403}}</TD></TR> | ||
+ | </table> | ||
====Comments==== | ====Comments==== | ||
− | + | The free join semilattice on a set $X$ is the set of all finite subsets of $X$ ordered by inclusion. | |
====References==== | ====References==== | ||
− | <table><TR><TD valign="top">[ | + | <table> |
+ | <TR><TD valign="top">[b1]</TD> <TD valign="top"> Peter T. Johnstone ''Sketches of an elephant'' Oxford University Press (2002) {{ISBN|0198534256}} {{ZBL|1071.18001}}</TD></TR> | ||
+ | </table> |
Latest revision as of 12:05, 23 November 2023
2020 Mathematics Subject Classification: Primary: 06A12 [MSN][ZBL]
A commutative idempotent semi-group, that is, a semi-group satisfying the identities $x+y=y+x$ and $x+x=x$. Every semi-lattice $p=\langle p,+\rangle$ can be turned into a partially ordered set (the partial order $\leq$ is defined by the relation $a\leq b$ if and only if $a+b=b$) in which for any pair of elements there is a least upper bound $\sup\{a,b\}=a+b$. Conversely, every partially ordered set with least upper bounds for every pair of elements is a semi-lattice with respect to the operation $a+b=\sup\{a,b\}$. In this case one says that the partially ordered set is an upper semi-lattice (or a join semi-lattice, or a $\vee$-semi-lattice). A lower semi-lattice, also called a meet semi-lattice or a $\wedge$-semi-lattice, is dually defined as a partially ordered set in which any two elements have a greatest lower bound.
Comments
A band is a semi-group every element of which is idempotent (cf. also Band of semi-groups) (which is a decomposition of a semi-group into sub-semi-groups forming a band). Thus, an upper (lower) semi-lattice defines a commutative band, and conversely.
References
[a1] | A.H. Clifford, G.B. Preston, "The algebraic theory of semigroups" , 1 , Amer. Math. Soc. (1961) pp. §1.8 Zbl 0111.03403 |
Comments
The free join semilattice on a set $X$ is the set of all finite subsets of $X$ ordered by inclusion.
References
[b1] | Peter T. Johnstone Sketches of an elephant Oxford University Press (2002) ISBN 0198534256 Zbl 1071.18001 |
Semi-lattice. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Semi-lattice&oldid=32831