Improved Quantum Hypercontractivity Inequality for the Qubit Depolarizing Channel

Abstract

The hypercontractivity inequality for the qubit depolarizing channel t states that \|t n(X)\|p≤ \|X\|q provided that p≥ q> 1 and t≥ p-1q-1. In this paper we present an improvement of this inequality. We first prove an improved quantum logarithmic-Sobolev inequality and then use the well-known equivalence of logarithmic-Sobolev inequalities and hypercontractivity inequalities to obtain our main result. As applications of these results, we present an asymptotically tight quantum Faber-Krahn inequality on the hypercube, and a new quantum Schwartz-Zippel lemma.