A STATISTICAL MECHANICS ANALYSIS OF THE SET COVERING PROBLEM

The dependence of the optimal solution average cost of the set covering problem on the density of 1's of the incidence matrix () and on the number of constraints (P) is investigated in the limit where the number of items (N) goes to infinity. The annealed approximation is employed to study two stochastic models: the constant density model, where the elements of the incidence matrix are statistically independent random variables, and the Karp model, where the rows of the incidence matrix possess the same number of 1's. Lower bounds for are presented in the case that P scales with ln N and is of order 1, as well as in the case that P scales linearly with N and is of order 1/N. It is shown that in the case that P scales with exp N and is of order 1 the annealed approximation yields exact results for both models.