Specific heat and entropy of N-body nonextensive systems

Abstract

We have studied finite N-body D-dimensional nonextensive ideal gases and harmonic oscillators, by using the maximum-entropy methods with the q- and normal averages (q: the entropic index). The validity range, specific heat and Tsallis entropy obtained by the two average methods are compared. Validity ranges of the q- and normal averages are 0 < q < qU and q > qL, respectively, where qU=1+(η DN)-1, qL=1-(η DN+1)-1 and η=1/2 (η=1) for ideal gases (harmonic oscillators). The energy and specific heat in the q- and normal averages coincide with those in the Boltzmann-Gibbs statistics, % independently of q, although this coincidence does not hold for the fluctuation of energy. The Tsallis entropy for N |q-1| 1 obtained by the q-average is quite different from that derived by the normal average, despite a fairly good agreement of the two results for |q-1 | 1. It has been pointed out that first-principles approaches previously proposed in the superstatistics yield additive N-body entropy (S(N)= N S(1)) which is in contrast with the nonadditive Tsallis entropy.