Kinetic energy and microcanonical nonanalyticities in finite and infinite systems

Abstract

In contrast to the canonical case, microcanonical thermodynamic functions can show nonanalyticities also for finite systems. In this paper we contribute to the understanding of these nonanalyticities by working out the relation between nonanalyticities of the microcanonical entropy and its configurational counterpart. If the configurational microcanonical entropy ωNc(v) has a nonanalyticity at v=vc, then the microcanonical entropy ωN(ε) has a nonanalyticity at the same value ε=vc of its argument for any finite value of the number of degrees of freedom N. The presence of the kinetic energy weakens the nonanalyticities such that, if the configurational entropy is p times differentiable, the entropy is p+ N/2 -times differentiable. In the thermodynamic limit, however, the behaviour is very different: The nonanalyticities do not longer occur at the same values of the arguments, but the nonanalyticity of the microcanonical entropy is shifted to a larger energy. These results give a general explanation of the peculiar behaviour previously observed for the mean-field spherical model. With the hypercubic model we provide a further example illustrating our results.