Recovery map stability for the Data Processing Inequality

Abstract

The Data Processing Inequality (DPI) says that the Umegaki relative entropy S(||σ) := Tr[( - σ)] is non-increasing under the action of completely positive trace preserving (CPTP) maps. Let M be a finite dimensional von Neumann algebra and N a von Neumann subalgebra if it. Let Eτ be the tracial conditional expectation from M onto N. For density matrices and σ in N, let N := Eτ and σ N := Eτ σ. Since Eτ is CPTP, the DPI says that S(||σ) ≥ S( N||σ N), and the general case is readily deduced from this. A theorem of Petz says that there is equality if and only if σ = R(σ N ), where R is the Petz recovery map, which is dual to the Accardi-Cecchini coarse graining operator A from M to N . In it simplest form, our bound is S(||σ) - S( N ||σ N ) ≥ (18π)4 \|σ,\|-2 \| R_ N -σ\|14 where σ, is the relative modular operator. We also prove related results for various quasi-relative entropies. Explicitly describing the solutions set of the Petz equation σ = R(σ N ) amounts to determining the set of fixed points of the Accardi-Cecchini coarse graining map. Building on previous work, we provide a throughly detailed description of the set of solutions of the Petz equation, and obtain all of our results in a simple self, contained manner.