Epsilon-net method for optimizations over separable states

Abstract

We give algorithms for the optimization problem: Q, where Q is a Hermitian matrix, and the variable is a bipartite separable quantum state. This problem lies at the heart of several problems in quantum computation and information, such as the complexity of QMA(2). While the problem is NP-hard, our algorithms are better than brute force for several instances of interest. In particular, they give PSPACE upper bounds on promise problems admitting a QMA(2) protocol in which the verifier performs only logarithmic number of elementary gate on both proofs, as well as the promise problem of deciding if a bipartite local Hamiltonian has large or small ground energy. For Q0, our algorithm runs in time exponential in \|Q\|F. While the existence of such an algorithm was first proved recently by Brand\~ao, Christandl and Yard [ Proceedings of the 43rd annual ACM Symposium on Theory of Computation, 343--352, 2011], our algorithm is conceptually simpler.