I have implemented a MIP-model in GAMS, which I would like to solve to proven optimality. The problem is degenerate and has a lot optimal solutions, and many solutions very close to the optimum. It is not terminating with the optimal solution, but continuing to examine nodes with a very small gap > 0.00 %. I have a good idea for a branching rule, which I believe can work around the degeneracy problems. Instead of doing binary branching on fractional binary variables, I intend to branch on the sum of some variables, i.e: sum(s, delta(s)) =l= k; or sum(s, delta(s)) =g= k+1;
How can I introduce such a branching rule in GAMS, instead of just using binary branching ?
Branching on sums of binary variables
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Re: Branching on sums of binary variables
You could introduce another integer variable sum_delta =e= sum(s, delta(s)); Now you can use branching priorities to instruct the MIP solver to first branch on the sum_delta variable and then on the delta(s):
If the multiple close to optimal solutions come from symmetry, you might also want to try a more aggressive level for symmetry braking cuts (see e.g. cplex option symmetry). Preprocessing at the node or aggressive probing might also help (see e.g. CPLEX options preslvnd and probe).
Code: Select all
delta.prior(s) = 100;
sum_delta.prior = 1;
mymodel.prioropt=1;
solve mymodel min obj using mip;