# Solving an integer linear program: why are solvers claiming a solvable instance is infeasible?

I'm trying to solve integer programming problems. I've tried both use SCIP and LPSolve

For example, given the final values of A and B, I want to solve for valA in the following C# code:

``````Int32 a = 0, b = 0;
a = a*-6 + b + 0x74FA - valA;
b = b/3 + a + 0x81BE - valA;
a = a*-6 + b + 0x74FA - valA;
b = b/3 + a + 0x81BE - valA;
// a == -86561, b == -32299
``````

Which I implemented as this integer program in lp format (the truncating division causes a few complications):

``````min: ;
+valA >= 0;
+valA < 92;
remAA_sign >= 0;
remAA_sign <= 1;
remAA <= 2;
remAA >= -2;
remAA +2 remAA_sign >= 0;
remAA +2 remAA_sign <= 2;
remAA +4294967296 remAA_range >= -2147483648;
remAA +4294967296 remAA_range <= 2147483647;
remAA +4294967296 remAA_range +2147483648 remAA_sign >= 0;
remAA +4294967296 remAA_range +2147483648 remAA_sign <= 2147483648;
-1 remAA +4294967296 remAA_range +3 remAA_mul3 = 0;
remAB_sign >= 0;
remAB_sign <= 1;
remAB <= 2;
remAB >= -2;
remAB +2 remAB_sign >= 0;
remAB +2 remAB_sign <= 2;
remAB +4294967296 remAB_range >= -2147483648;
remAB +4294967296 remAB_range <= 2147483647;
remAB +4294967296 remAB_range +2147483648 remAB_sign >= 0;
remAB +4294967296 remAB_range +2147483648 remAB_sign <= 2147483648;
+1431655765 remAA +1 offA -2 valA +1 offB -1 remAB +4294967296 remAB_range +3 remAB_mul3 = 0;
a = -86561;
b = -32299;
offA = 29946;
offB = 33214;
-4 offA +3 valA +1431655765 remAA +1 offB +4294967296 Fa - a = 0;
+477218588 remAA -1431655769 offA -1431655764 valA -1431655763 offB +1431655765 remAB +4294967296 Fb - b = 0;
int valA;
int remAA;
int remAA_range;
int remAA_sign;
int remAA_mul3;
int remAB;
int remAB_range;
int remAB_sign;
int remAB_mul3;
int Fa;
int Fb;
int offA;
int offB;
int a;
int b;
``````

And then tried to solve it:

``````The model is INFEASIBLE
``````

However, I know that there is a feasible solution because I know a variable assignment that works. Adding the following conditions causes a solution to be found:

``````a = -86561;
b = -32299;
offA = 29946;
offB = 33214;
valA = 3;
remAA = 0;
remAA_range = 0;
remAA_sign = 0;
remAA_mul3 = 0;
remAB = 1;
remAB_range = 0;
remAB_sign = 0;
remAB_mul3 = -21051;
Fa = 0;
Fb = 21054;
``````

Two different solvers have claimed this feasible problem is infeasible. Am I violating some unwritten condition? What's going on? Are there solvers that actually solve the problem?

-
If you build your model, export a .lp file and send it to me I will run it through CPLEX. It has good conflict (infeasibility) information. My email address is my user name at gmail dot com. I guess you could also just put it on Pastebin or something similar. –  raoulcousins Apr 14 '13 at 19:20
@raoul I've emailed the lp-cplex files I used with scip. –  Strilanc Apr 14 '13 at 20:38
I solved it with CPLEX and it was feasible. The optimal solution had an objective function value of zero. This was the same as the LP relaxation, which had a basis matrix with condition number (kappa) of 3.4. With the extra constraints, the objective function was the same; the condition number of 4.6. I'm not sure what CPLEX is doing under the hood that is different from SCIP for this specific problem. Could you solve your model with neos-server.org and use CPLEX? –  raoulcousins Apr 14 '13 at 22:22
I grabbed a trial version of cplex and it does solve it. Unfortunately I exceed the valid range on the actual difficult problems I want to solve. I don't think they're designed for modular arithmetic. –  Strilanc Apr 15 '13 at 0:37
MIP solvers. In principle they could recognize equations like x + someNewInt*2^32 = y as being equivalent to x = y (mod 2^32), and thus avoid dealing with the potentially ridiculously huge value of someNewInt. In practice they don't, and so someNewInt exceeds internal limits and causes the solver to fail. –  Strilanc Apr 15 '13 at 6:06