Cartesian monoid: Difference between revisions

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.^[1]

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

Monoid

${\displaystyle *}$ is a monoid with identity ${\displaystyle e}$

Left Projection

${\displaystyle L*(x,y)=x}$

Right Projection

${\displaystyle R*(x,y)=y}$

Surjective Pairing

${\displaystyle (L*x,R*x)=x}$

Right Homogeneity

${\displaystyle (x*z,y*z)=(x,y)*z}$

The interpretation is that ${\displaystyle L}$ and ${\displaystyle R}$ are left and right projection functions respectively for the pairing function ${\displaystyle (-,-)}$.

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