Two-parameter generalization of the logarithm and exponential functions and Boltzmann-Gibbs-Shannon entropy
Abstract
The q-sum x q y x+y+(1-q) xy (x 1 y=x+y) and the q-product xq y [x1-q +y1-q-1]11-q (x1 y=x y) emerge naturally within nonextensive statistical mechanics. We show here how they lead to two-parameter (namely, q and q) generalizations of the logarithmic and exponential functions (noted respectively q,qx and eq,q^x), as well as of the Boltzmann-Gibbs-Shannon entropy SBGS -k Σi=1Wpi pi (noted Sq,q). The remarkable properties of the (q,q)-generalized logarithmic function make the entropic form Sq,q k Σi=1W pi q,q(1/pi) to satisfy, for large regions of (q,q), important properties such as expansibility, concavity and Lesche-stability, but not necessarily composability.
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