On Strong Converse Bounds for the Private and Quantum Capacities of Anti-degradable Channels

Abstract

We establish a strong converse bound for the private classical capacity of anti-degradable quantum channels. Specifically, we prove that this capacity is zero whenever the error ε > 0 and privacy parameter δ > 0 satisfy the inequality δ (1-ε2)12+ε (1-δ2)12<1. This result strengthens previous understandings by sharply defining the boundary beyond which reliable and private communication is impossible. Furthermore, we present a ``pretty simple'' proof of the ``pretty strong'' converse for the quantum capacity of anti-degradable channels, valid for any error ε < 12. Our approach offers clarity and technical simplicity, shedding new light on the fundamental limits of quantum communication.