English

Dimensions, lengths and separability in finite-dimensional quantum systems

Quantum Physics 2013-05-15 v4 Mathematical Physics math.MP

Abstract

Many important sets of normalized states in a multipartite quantum system of finite dimension d, such as the set S of all separable states, are real semialgebraic sets. We compute dimensions of many such sets in several low-dimensional systems. By using dimension arguments, we show that there exist separable states which are not convex combinations of d or less pure product states. For instance, such states exist in bipartite M x N systems when (M-1)(N-1)>1. This solves an open problem proposed in [J. Mod. Opt. 47 (2000), 377-385]. We prove that there exist a separable state rho and a pure product state, whose mixture has smaller length than that of rho. We show that any real rho in S, which is invariant under all partial transpose operations, is a convex sum of real pure product states. In the case of the 2 x N system, the number r of product states can be taken to be r=rank(rho). We also show that the general multipartite separability problem can be reduced to the case of real states. Regarding the separability problem, we propose two conjectures describing S as a semialgebraic set, which may eventually lead to an analytic solution in some low-dimensional systems such as 2 x 4, 3 x 3 and 2 x 2 x 2.

Keywords

Cite

@article{arxiv.1206.3775,
  title  = {Dimensions, lengths and separability in finite-dimensional quantum systems},
  author = {Lin Chen and Dragomir Z. Djokovic},
  journal= {arXiv preprint arXiv:1206.3775},
  year   = {2013}
}

Comments

Final version, 11 pages, 2 tables

R2 v1 2026-06-21T21:20:47.485Z