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:

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?