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I'm trying to add a basic constraint to my solver foundation by doing the following:

model.AddConstraint("c1", x % y == 0);

I get a compile error saying "Operator '%' cannot be applied to operands of type 'Microsoft.SolverFoundation.Services.Decision' and 'Microsoft.SolverFoundation.Services.Decision'".

This makes sense since a lot of operators aren't supported. However, a lot of the operators that aren't supported (sin, cos, tan, etc.) are available as specific methods on the Model class such as below:

model.AddConstraint("c1", Model.Sum(x,y) == 0);

If I replace "Sum" with "Mod", there is no method available.

Any ideas on how to perform a modulo operation in Solver Foundation? According to the documentation here, it is supported.

I am going to start using reflector to dig through the code, but I figured I would post it on here also. If I find a solution, I will update my question to include the answer.

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2 Answers 2

Really interesting, I wanted to write the exact same question at SO :-)

I found out that a Mod operator is defined for the OML language at http://msdn.microsoft.com/en-us/library/ff818505(v=vs.93).aspx.

There is an overload of the AddConstraint method, that accepts an expression string(I guess an OML expression?) instead of the Term. Unfortunately, I don't know the right formatting, but once we get the knack out of it, we would be able to use all of the other operators as well.

EDIT

It looks like not every OML expression described in API is working. For example,

SolverContext sc = SolverContext.GetContext();
Model m = sc.CreateModel();

m.AddDecision(new Decision(Domain.IntegerRange(0,10), "a"));
m.AddDecision(new Decision(Domain.IntegerRange(0, 10), "b"));

m.AddConstraint(null, "a > 0");
m.AddConstraint(null, "b == Plus[a,2]");

The Plus[x,y] in this case is working and the solver computes the following decision

a: 1, b: 3

But if I replace the last constraint with this one

m.AddConstraint(null, "b == Mod[a,2]");

I get an OmlParseException ("Failed to parse OML model. Expression: Mod[a,2]."). I guess we are on our own here and purhaps the best thing we can do is sticking with the answer of user141603.

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Yes, that is what I was trying to use at first. The syntax is supposedly Mod[x,y], but that throws an error. I tried it for Plus[x,2] as well and that didn't work either so it's got to be the syntax that's wrong. Let me know if you find anything useful. –  user1574360 Dec 10 '12 at 15:31

I don't see Mod at http://msdn.microsoft.com/en-us/library/ff525341(v=vs.93).aspx, but here's a workaround:

Model.Floor(Model.Quotient(x,y))==Model.Ceiling(Model.Quotient(x,y))

This is only true if x/y is an integer, and so x%y==0.

There are also other ways of combining the allowed operators to check if it is divisible. My favorite (though I wouldn't recommend it because of floating point precision) is

Model.Sin(Math.PI*Model.Quotient(x,y))==0 
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That makes sense. This works when calling the Solve() method, but then doesn't work context.FindAllowedValues(bindings); I get an UnsolvableModelException saying "No solver could be found that can accept the model given the model type and directive(s)". I really need to get a list of all values that satisfy the condition. Do I need to specify another solver that can handle non-linear models? –  user1574360 Dec 9 '12 at 21:43
    
@user1574360 Sorry, I don't know. Try the Sin workaround though, and see if that works. It could be that the non-smoothness of floor and ceiling are causing issue with that solver. –  0xFE Dec 11 '12 at 23:26

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