Margrabe's formula

From formulasearchengine
Revision as of 21:53, 5 January 2014 by 68.63.42.204 (talk) (fix a typo)
Jump to navigation Jump to search

Template:Orphan

A Cartesian monoid is a monoid, with additional structure of pairing and projection operators. It was first formulated by Dana Scott and Joachim Lambek independently.

Definition

A Cartesian monoid is a structure with signature *,e,(,),L,R where * and (,) are binary operations, L,R, and e are constants satisfying the following axioms for all x,y,z in its universe:

Monoid
* is a monoid with identity e
Left Projection
L*(x,y)=x
Right Projection
R*(x,y)=y
Surjective Pairing
(L*x,R*x)=x
Right Homogeneity
(x*z,y*z)=(x,y)*z

The interpretation is that L and R are left and right projection functions respectively for the pairing function (,).