Unextendible Product Bases, Uncompletable Product Bases and Bound Entanglement

Abstract

We report new results and generalizations of our work on unextendible product bases, uncompletable product bases and bound entanglement. We present a new construction for bound entangled states based on product bases which are only completable in a locally extended Hilbert space. We introduce a very useful representation of a product basis, an orthogonality graph. Using this representation with orthogonality graphs, we give a complete characterization of unextendible product bases for two qutrits. We give and conjecture several generalizations of UPBs to arbitrary high dimensions and multipartite systems. We present a sufficient condition for sets of orthogonal product states to be distinguishable by separable superoperators. We prove that bound entangled states cannot help increase the distillable entanglement of a state beyond its entanglement of formation.