中文

A new one parameter deformation of the exponential function

统计力学 2015-06-24 v1 软凝聚态物质

摘要

Recently, in the ref. Physica A \bfm{296} 405 (2001), a new one parameter deformation for the exponential function exp{κ}(x)=(1+κ2x2+κx)1/κ;exp{0}(x)=exp(x)\exp_{_{\{{\scriptstyle \kappa}\}}}(x)= (\sqrt{1+\kappa^2x^2}+\kappa x)^{1/\kappa}; \exp_{_{\{{\scriptstyle 0}\}}}(x)=\exp (x), which presents a power law asymptotic behaviour, has been proposed. The statistical distribution f=Z1exp{κ}[β(Eμ)]f=Z^{-1}\exp_{_{\{{\scriptstyle \kappa}\}}}[-\beta(E-\mu)], has been obtained both as stable stationary state of a proper non linear kinetics and as the state which maximizes a new entropic form. In the present contribution, starting from the κ\kappa-algebra and after introducing the κ\kappa-analysis, we obtain the κ\kappa-exponential exp{κ}(x)\exp_{_{\{{\scriptstyle \kappa}\}}}(x) as the eigenstate of the κ\kappa-derivative and study its main mathematical properties.

引用

@article{arxiv.cond-mat/0109537,
  title  = {A new one parameter deformation of the exponential function},
  author = {G. Kaniadakis and A. M. Scarfone},
  journal= {arXiv preprint arXiv:cond-mat/0109537},
  year   = {2015}
}

备注

5 pages including 2 figures. Paper presented in NEXT2001 Meeting