Ribeiro Mauricio S, Tsallis Constantino, Nobre Fernando D
Centro Brasileiro de Pesquisas Físicas.
Centro Brasileiro de Pesquisas Físicas and National Institute of Science and Technology for Complex Systems Rua Xavier Sigaud 150-Urca, Rio de Janeiro, Rio de Janeiro 22290-180, Brazil and Santa Fe Institute, 1399 Hyde Park Road, Santa Fe, New Mexico 87501, USA.
Phys Rev E Stat Nonlin Soft Matter Phys. 2013 Nov;88(5):052107. doi: 10.1103/PhysRevE.88.052107. Epub 2013 Nov 6.
Under the assumption that the physically appropriate entropy of generic complex systems satisfies thermodynamic extensivity, we investigate the recently introduced entropy S(δ) (which recovers the usual Boltzmann-Gibbs form for δ=1) and establish the microcanonical and canonical extremizing distributions. Using a generalized version of the H theorem, we find the nonlinear Fokker-Planck equation associated with that entropic functional and calculate the stationary-state probability distributions. We demonstrate that both approaches yield one and the same equation, which in turn uniquely determines the probability distribution. We show that the equilibrium distributions asymptotically behave like stretched exponentials, and that, in appropriate probability-energy variables, an interesting return occurs at δ=4/3. As a mathematically simple illustration, we consider the one-dimensional harmonic oscillator and calculate the generalized chemical potential for different values of δ.
在一般复杂系统的物理适当熵满足热力学广延性的假设下,我们研究了最近引入的熵(S(δ))(当(δ = 1)时恢复为通常的玻尔兹曼 - 吉布斯形式),并建立了微正则和正则极值分布。使用(H)定理的广义版本,我们找到了与该熵泛函相关的非线性福克 - 普朗克方程,并计算了稳态概率分布。我们证明这两种方法产生的是同一个方程,进而唯一地确定了概率分布。我们表明平衡分布渐近地表现为拉伸指数形式,并且在适当的概率 - 能量变量中,在(δ = 4/3)时会出现有趣的回归。作为一个数学上简单的例子,我们考虑一维谐振子并计算不同(δ)值下的广义化学势。
