https://doi.org/10.1140/epjc/s10052-015-3434-5
Regular Article - Theoretical Physics
Non-extended phase space thermodynamics of Lovelock AdS black holes in the grand canonical ensemble
1
Department of Physics, Institute of Theoretical Physics, Beijing Normal University, Beijing, 100875, China
2
Institute of Theoretical Physics, Lingnan Normal University, Zhanjiang, 524048, Guangdong, China
* e-mail: wbliu@bnu.edu.cn
Received:
7
January
2015
Accepted:
28
April
2015
Published online:
14
May
2015
Recently, extended phase space thermodynamics of Lovelock AdS black holes has been of great interest. To provide insight from a different perspective and gain a unified phase transition picture, the non-extended phase space thermodynamics of -dimensional charged topological Lovelock AdS black holes is investigated in detail in the grand canonical ensemble. Specifically, the specific heat at constant electric potential is calculated and the phase transition in the grand canonical ensemble is discussed. To probe the impact of the various parameters, we utilize the control variate method and solve the phase transition condition equation numerically for the cases . There are two critical points for the case , while there is only one for the other cases. For , there exists no phase transition point. To figure out the nature of the phase transition in the grand canonical ensemble, we carry out an analytic check of the analog form of the Ehrenfest equations proposed by Banerjee et al. It is shown that Lovelock AdS black holes in the grand canonical ensemble undergo a second-order phase transition. To examine the phase structure in the grand canonical ensemble, we utilize the thermodynamic geometry method and calculate both the Weinhold metric and the Ruppeiner metric. It is shown that for both analytic and graphical results that the divergence structure of the Ruppeiner scalar curvature coincides with that of the specific heat. Our research provides one more example that Ruppeiner metric serves as a wonderful tool to probe the phase structures of black holes.
© SIF and Springer-Verlag Berlin Heidelberg, 2015