# Representing mathematical relations in Alloy

I am new to Alloy and I am still quite confused. I am relatively comfortable with mathematical relations but not sure how to translate those to Alloy.

Say I have the following definition of a (mathematical) relation

rel = {(x, y) | x \in S1, y \in S2}


Is the following Alloy fragment a correct representation for 'rel'?

sig S2 {}

sig S1 {rel: S2}


How would I constrain this relation to be irreflexive and transitive?

Yes, your model defines rel to be a relation between the sets S1 and S2. To constrain the relation you could write something like that:

fact antireflexive { no iden & rel }


That is, there's no element mapped to itself in rel

And

fact transitive { rel = ^rel }


Meaning that rel is equal to its transitive closure and therefore transitive.

• Having looked at your fragment again I've noticed that you have constrained your relation such that it maps each element in S1 to exactly one element in S2, if you want it to be an unrestricted relation you should write rel:set S2 – David Faitelson Oct 11 '15 at 18:42
• Thanks for reply. This helps – Vinod Grover Oct 12 '15 at 18:49

First define the types:

 sig S1, S2 {}


Then you can define a rel relation with the following equivalent syntaxes

let rel = { x : univ, y : univ | x in S1 and y in S2 }
let rel = { x : S1, y : S2 }
let rel = S1 -> S2