Composition law of -entropy for statistically independent systems

Abstract

The intriguing and still open question concerning the composition law of -entropy S(f)=12Σi (fi1--fi1+) with 0<<1 and Σi fi =1 is here reconsidered and solved. It is shown that, for a statistical system described by the probability distribution f=\ fij\, made up of two statistically independent subsystems, described through the probability distributions p=\ pi\ and q=\ qj\, respectively, with fij=piqj, the joint entropy S(p\,q) can be obtained starting from the S(p) and S(q) entropies, and additionally from the entropic functionals S(p/e) and S(q/e), e being the -Napier number. The composition law of the -entropy is given in closed form, and emerges as a one-parameter generalization of the ordinary additivity law of Boltzmann-Shannon entropy recovered in the → 0 limit.