Efficiency at maximum power output of quantum heat engines under finite-time operation

Abstract

We study the efficiency at maximum power, ηm, of irreversible quantum Carnot engines (QCEs) that perform finite-time cycles between a hot and a cold reservoir at temperatures Th and Tc, respectively. For QCEs in the reversible limit (long cycle period, zero dissipation), ηm becomes identical to Carnot efficiency η_C=1-TcTh. For QCE cycles in which nonadiabatic dissipation and time spent on two adiabats are included, the efficiency ηm at maximum power output is bounded from above by η_C2-η_C and from below by η_C2. In the case of symmetric dissipation, the Curzon-Ahlborn efficiency η_CA=1-TcTh is recovered under the condition that the time allocation between the adiabats and the contact time with the reservoir satisfy a certain relation.