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In [[mathematics]], '''quantales''' are certain [[partially ordered set|partially ordered]] [[algebraic structure]]s that generalize locales ([[pointless topology|point free topologies]]) as well as various multiplicative [[lattice (order)|lattices]] of [[Ideal (ring theory)|ideal]]s from ring theory and functional analysis ([[C-star algebra|C*-algebras]], [[von Neumann algebra]]s). Quantales are sometimes referred to as ''complete residuated semigroups''.
 
A '''quantale''' is a [[complete lattice]] ''Q'' with an [[associative]] [[binary operation]] &lowast; : ''Q'' &times; ''Q'' &rarr; ''Q'', called its '''multiplication''', satisfying
 
:<math>x*(\bigvee_{i\in I}{y_i})=\bigvee_{i\in I}(x*y_i)</math>
 
and
 
:<math>(\bigvee_{i\in I}{y_i})*{x}=\bigvee_{i\in I}(y_i*x)</math>
 
for all ''x'', ''y<sub>i</sub>'' in ''Q'', ''i'' in ''I'' (here ''I'' is any [[index set]]).
 
The quantale is '''unital''' if it has an [[identity element]] ''e'' for its multiplication:
 
: ''x'' &lowast; ''e'' = ''x'' = ''e'' &lowast; ''x''
 
for all ''x'' in ''Q''. In this case, the quantale is naturally a [[monoid]] with respect to its multiplication &lowast;.
 
A unital quantale may be defined equivalently as a [[Monoid (category theory)|monoid]] in the category [[Complete_lattice#Morphisms_of_complete_lattices|Sup]] of complete join semi-lattices.
 
A unital quantale is an idempotent [[semiring]], or dioid, under join and multiplication.
 
A unital quantale in which the identity is the [[Greatest element|top element]] of the underlying lattice, is said to be '''strictly two-sided''' (or simply ''integral'').
 
A '''commutative quantale''' is a quantale whose multiplication is [[commutative]]. A [[complete Heyting algebra|frame]], with its multiplication given by the [[Meet (mathematics)|meet]] operation, is a typical example of a strictly two-sided commutative quantale. Another simple example is provided by the [[unit interval]] together with its usual [[multiplication]].
 
An '''idempotent quantale''' is a quantale whose multiplication is [[idempotent]]. A [[complete Heyting algebra|frame]] is the same as an idempotent strictly two-sided quantale.
 
An '''involutive quantale''' is a quantale with an involution:
 
:<math>(xy)^\circ = y^\circ x^\circ</math>
that preserves joins:
 
:<math>\biggl(\bigvee_{i\in I}{x_i}\biggr)^\circ =\bigvee_{i\in I}(x_i^\circ).</math>
 
A '''quantale [[homomorphism]]''' is a [[map (mathematics)|map]] f : ''Q<sub>1</sub>'' &rarr; ''Q<sub>2</sub>'' that preserves joins and multiplication for all ''x'', ''y'', ''x<sub>i</sub>'' in ''Q'', ''i'' in ''I'':
 
:<math>f(xy) = f(x)f(y)</math>
 
:<math>f\biggl(\bigvee_{i \in I}{x_i}\biggl) = \bigvee_{i \in I} f(x_i)</math>
 
==References==
*{{springer|id=Q/q130010|title=Quantales|author=C.J. Mulvey}} [http://www.encyclopediaofmath.org/index.php?title=Quantale&oldid=17639]
* J. Paseka, J. Rosicky, Quantales, in: [[Bob Coecke|B. Coecke]], D. Moore, A. Wilce, (Eds.), ''Current Research in Operational Quantum Logic: Algebras, Categories and Languages'', Fund. Theories Phys., vol. 111, Kluwer Academic Publishers, 2000, pp.&nbsp;245–262.
* K. Rosenthal, ''Quantales and Their Applications'', Pitman Research Notes in Mathematics Series 234, Longman Scientific & Technical, 1990.
 
[[Category:Order theory]]

Revision as of 21:47, 1 February 2014

In mathematics, quantales are certain partially ordered algebraic structures that generalize locales (point free topologies) as well as various multiplicative lattices of ideals from ring theory and functional analysis (C*-algebras, von Neumann algebras). Quantales are sometimes referred to as complete residuated semigroups.

A quantale is a complete lattice Q with an associative binary operation ∗ : Q × QQ, called its multiplication, satisfying

x*(iIyi)=iI(x*yi)

and

(iIyi)*x=iI(yi*x)

for all x, yi in Q, i in I (here I is any index set).

The quantale is unital if it has an identity element e for its multiplication:

xe = x = ex

for all x in Q. In this case, the quantale is naturally a monoid with respect to its multiplication ∗.

A unital quantale may be defined equivalently as a monoid in the category Sup of complete join semi-lattices.

A unital quantale is an idempotent semiring, or dioid, under join and multiplication.

A unital quantale in which the identity is the top element of the underlying lattice, is said to be strictly two-sided (or simply integral).

A commutative quantale is a quantale whose multiplication is commutative. A frame, with its multiplication given by the meet operation, is a typical example of a strictly two-sided commutative quantale. Another simple example is provided by the unit interval together with its usual multiplication.

An idempotent quantale is a quantale whose multiplication is idempotent. A frame is the same as an idempotent strictly two-sided quantale.

An involutive quantale is a quantale with an involution:

(xy)=yx

that preserves joins:

(iIxi)=iI(xi).

A quantale homomorphism is a map f : Q1Q2 that preserves joins and multiplication for all x, y, xi in Q, i in I:

f(xy)=f(x)f(y)
f(iIxi)=iIf(xi)

References

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  • J. Paseka, J. Rosicky, Quantales, in: B. Coecke, D. Moore, A. Wilce, (Eds.), Current Research in Operational Quantum Logic: Algebras, Categories and Languages, Fund. Theories Phys., vol. 111, Kluwer Academic Publishers, 2000, pp. 245–262.
  • K. Rosenthal, Quantales and Their Applications, Pitman Research Notes in Mathematics Series 234, Longman Scientific & Technical, 1990.