Without additional resources, it is often impossible to transform one
entangled quantum state into another with local quantum operations and
classical communication. Jonathan and Plenio [Phys. Rev. Lett. 83, 3566(1999)]
presented an interesting example showing that the presence of another state,
called a catalyst, enables such a transformation without changing the catalyst.
They also pointed out that in general it is very hard to find an analytical
condition under which a catalyst exists. In this paper we study the existence
of catalysts for two incomparable quantum states. For the simplest case of
2×2 catalysts for transformations from one 4×4 state to
another, a necessary and sufficient condition for existence is found. For the
general case, we give an efficient polynomial time algorithm to decide whether
a k×k catalyst exists for two n×n incomparable states, where
k is treated as a constant.Comment: 12 pages. Presentation part improved. Main results unchanged.
Essentially the journal versio