# Known values for variables in a linear program written in Mathprog

I have a linear program written in MathProg. My unknown binary variable is a two-dimensional array defined as:

``````var x{i in V, l in L}, >=0, <=1;
``````

where V and L are sets of integers.

The value of some variables, however, are known in advance and I would like to specify this for the solver in order to reduce the size of the ILP. For example I know that x[4,l] when l=2 is 1 and for any other values of l is zero. Currently, I specify this as as a constraint:

``````s.t. initial4{i in V: i=4}:   sum{l in L}(l*x[i,l]) = 2;
``````

I was wondering if this is the efficient way of specifying the values of a subset of unknowns in advance.

Ideally, I would like to place such information in a separate file together with the data section rather than in the model file.

-

Create an upper bound and lower bound for each variable:

``````var x{i in index_set}, >=x_L[i], <=x_U[i];
``````

and adjust the lower and upper bounds for the known values.

Here is a MathProg snippet fixing `x[2]` to zero:

``````set index_set;

param x_L{index_set};
param x_U{index_set};

var x{i in index_set}, >=x_L[i], <=x_U[i];

s.t.

dummy:
sum{i in index_set} x[i] = 2;

solve;

display x;

data;

set index_set := 1, 2, 3;

param x_L default 0;
param x_U default 1 :=
2 0;

end;
``````

From the (filtered) output it is clear that the preprocessor is smart enough to fix `x[2]` to 0:

``````glpsol --math test.mod

OPTIMAL SOLUTION FOUND BY LP PREPROCESSOR

x[1].val = 1
x[2].val = 0
x[3].val = 1
``````
-
Thanks for the reply. I am using GLPK and wrote my model in GNU's MathProg. Unfortunately, MathProg doesn't have the keyword "let". –  Ari May 16 '12 at 19:48
Fair enough. I updated the answer to be MathProg compatible. –  Ali May 17 '12 at 10:46
Great. I like this better than my solution. I think the summary of your answer is to create an upper bound and lower bound for every variable: var x{i in index_set}, >=x_L[i], <=x_U[i]; and adjust the lower and upper bounds for the known values. –  Ari May 17 '12 at 17:40
Yes, exactly. I edited my answer and not it starts with your summary. Thanks for pointing it out. Good luck! –  Ali May 17 '12 at 19:08