Complexity of mixed Schatten norms of quantum maps

Abstract

We study the complexity of computing the mixed Schatten \|\|q p norms of linear maps between matrix spaces. When is completely positive, we show that \| \|q p can be computed efficiently when q ≥ p. The regime q ≥ p is known as the non-hypercontractive regime and is also known to be easy for the mixed vector norms q p [Boyd, 1974]. However, even for entanglement-breaking completely-positive trace-preserving maps , we show that computing \| \|1 p is NP-complete when p>1. Moving beyond the completely-positive case and considering to be difference of entanglement breaking completely-positive trace-preserving maps, we prove that computing \| \|+1 1 is NP-complete. In contrast, for the completely-bounded (cb) case, we describe a polynomial-time algorithm to compute \|\|cb,1 p and \|\|+cb,1 p for any linear map and p≥1.