Mixing Time of Markov chain of the Knapsack Problem

Abstract

To find the number of assignments of zeros and ones satisfying a specific Knapsack Problem is \#P hard, so only approximations are envisageable. A Markov chain allowing uniform sampling of all possible solutions is given by Luby, Randall and Sinclair. In 2005, Morris and Sinclair, by using a flow argument, have shown that the mixing time of this Markov chain is O(n9/2+ε), for any ε > 0. By using a canonical path argument on the distributive lattice structure of the set of solutions, we obtain an improved bound, the mixing time is given as τ_x(ε) ≤ n3 (16 ε-1).