五维黒弦的热力学性质和热力学几何性质
Thermodynamic properties and thermodynamic geometries of 5D black string
摘要
计算了五维黒弦的热容量和电容率;获得了五维黒弦的Ruppeiner几何和Weinhold几何的度规,并指出二者度规不存在共形的关系.
The heat capacity and electric capacitance of 5D black string are calculated. The Ruppeiner' s metric and Weinhold' s metric are obtained. It is found that the ratios between the Ruppeiner' s metric compo- nents and the Weinhold' s metric components are different.
出处
《渤海大学学报(自然科学版)》
CAS
2013年第3期267-271,共5页
Journal of Bohai University:Natural Science Edition
基金
辽宁省教育厅项目资助(2009A039)
关键词
五维黒弦
热容量
电容率
热力学几何
black string
heat capacity
electric capacitance
thermodynamic geometry
参考文献8
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1LIU Mo - lin, LIU Hong - ya, XU Li - xin, et al. Radiation and potential barrier of a 5 D black sting Solution [ J ]. Mod. Phys. Lett. A, 2006, 21 (39) : 2937 -2945.
-
2Weinhold F. Metric geometry of equilibrium thermodynamics [ J ]. J. Chem. Phys, 1975, 63 (6) : 2479 - 2483.
-
3Ruppeiner G. A riemannian geometric model[J]. Phys. Rev. A, 1979, 20(4) : 1608 - 1613.
-
4Ruppeiner G. Riemannian geometry in thermodynamic fluctuation theory[ J]. Rev. Mod. Phys, 1995, 67 (3) : 605 -659.
-
5CAI Rong- gen. Effective spatial dimension of extremal nondilatonic black p -branes and the description on the world volume[ J]. Phys. Rev. Lett, 1997, 78(13): 2531 -2534.
-
6魏益焕.RNQ黑洞的热力学性质[J].渤海大学学报(自然科学版),2012,33(3):216-218. 被引量:3
-
7Gibbons G W, Homwitz G T, and Townsend P K. Higher - dimensional resolution of dilatonic black - hole singularities[J]. Class. Quant. Gray, 1995, 12(2) : 297 -317.
-
8Gibbons G W, Ida D, Shiromizu T. Uniqueness of (dilatonic) charged black holes and black p -branes in higher dimensions[ J]. Phys. Rev. D, 2002, 66(4) : 044010.
二级参考文献6
-
1Kiselev V V. Quintessence and black holes[J]. Class Quant. Gray,2003,20: 1187 -1198.
-
2Wei Y H and Chu Z H. Thermodynamic Properties of a Reissner - Nordstrom Quintessence Black Hole[ J]. Chin. Phys. Lett ,2011,28 : 100403.
-
3Padmanabhan T. Gravity and the Thermodynamics of Horizons[ J] Phys. Rep,2005,406 : 49 - 125.
-
4Padmanabhan T. Classical and Quantum Thermodynamics of horizons in spherically symmetric spacetimes[ J]. Class. Quantum Grav,2002,19 : 5387 - 5408.
-
5Tian Y and Wu X N. Dynamics of Gravity as Thermodynamics on the Spherical Holographic Screen [J].Phys. Rev. D,2011,83: 021501.
-
6Wei Y H. Understanding first law of thermodynamics of black holes[J] Phys. Lett,2009,B672:98 -100.
