Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have two classes A and B and a relation with extra data of class R on them.

So, A and B are related to each other via R.

sig A {}
sig B {}

sig R {
    a : A,
    b : B,
    data : Bool
}

here, Bool is defined as:

sig Bool {}
sig True, False extends Bool {}

Now, I extend A like this:

sig A{
    allb : some B
}

Which contains all instances of B for which there is a relation between this A and that B and where the data is of type True.

I want to express the following logical statement as an Alloy fact:

Formal version of text above

I assume here that True == 1 and False != 1 and that the sets A and R contain all instances of A and R respectively.

What I've tried so far is to define a fun trueR(a : A) which should return all R's for which R.a = a and r.data = True and a fact allbIsRTrue which states that for each A allb should be the sum of the R.b's returned by trueR.

However, here is where I get stuck, I can't find the right construct to sum over sets in the reference and tries with sum have resulted in syntax errors.

How would I specify my formal constraint as an Alloy fact?

share|improve this question

1 Answer 1

up vote 2 down vote accepted

I think you want to use set comprehension. In Alloy, this is the syntax for set comprehension

{x: X | f(x)}

The expression above evaluates to a set of X's for which f(x) holds.

In your example, to express the fact for allB you can write something like

fact fAllB {
    all a: A | 
        a.allB = {b: B | 
            some r: R | r.ra = a and r.rb = b and r.data = True}
}

In English, this fact reads "for all a of set A, a.allB is a set of all B's such that there exist some r which "connects" those exact a and b and for which r.data is True.

Note the following modifications I made to the rest of your model:

  • I made the Bool sig abstract because you probably don't want bools that are neither True nor False

  • I made the True and False sigs singleton sigs (i.e., one sig) because you probably want to have exactly one atom of each of them

  • I renamed relations a and b to ra and rb to avoid name aliasing and potential confusion

Here is the rest of your model that I used for this example

abstract sig Bool {}
one sig True, False extends Bool {}

sig A {
  allB: set B
} 
sig B {}
sig R {
  ra : A,
  rb : B,
  data : Bool
}
share|improve this answer
    
Thank you very much for that detailed description and the suggestions for the boolean type! –  Tim van Dalen Oct 21 '12 at 8:05

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.