Minimizing Quantum Rényi Divergences via Mirror Descent with Polyak Step Size

You, Jun KaiJun KaiYouHAO-CHUNG CHENGYEN-HUAN LI2023-05-292023-05-292022-01-01978166542159121578095https://scholars.lib.ntu.edu.tw/handle/123456789/631488Quantum information quantities play a substantial role in characterizing operational quantities in various quantum information-theoretic problems. We consider the numerical computation of four quantum information quantities: Petz-Augustin information, sandwiched Augustin information, conditional sandwiched Rényi entropy, and sandwiched Rényi information. To compute these quantities requires minimizing some order-α quantum Rényi divergences over the set of quantum states. Whereas the optimization problems are obviously convex, they violate standard bounded gradient/Hessian conditions in the literature, so existing convex optimization methods and their convergence guarantees do not directly apply. In this paper, we propose a new class of convex optimization methods called mirror descent with the Polyak step size. We prove their convergence under a weak condition, showing that they provably converge for minimizing quantum Rényi divergences. Numerical experiment results show that entropic mirror descent with the Polyak step size converges fast in minimizing quantum Rényi divergences.[SDGs]SDG10Minimizing Quantum Rényi Divergences via Mirror Descent with Polyak Step Sizeconference paper10.1109/ISIT50566.2022.98346482-s2.0-85136281335https://api.elsevier.com/content/abstract/scopus_id/85136281335