Is the entropy Sq extensive or nonextensive?

Abstract

The cornerstones of Boltzmann-Gibbs and nonextensive statistical mechanics respectively are the entropies SBG -k Σi=1W pi pi and Sq k (1-Σi=1Wpiq)/(q-1) (q∈ R ; S1=SBG). Through them we revisit the concept of additivity, and illustrate the (not always clearly perceived) fact that (thermodynamical) extensivity has a well defined sense only if we specify the composition law that is being assumed for the subsystems (say A and B). If the composition law is not explicitly indicated, it is tacitly assumed that A and B are statistically independent. In this case, it immediately follows that SBG(A+B)= SBG(A)+SBG(B), hence extensive, whereas Sq(A+B)/k=[Sq(A)/k]+[Sq(B)/k]+(1-q)[Sq(A)/k][Sq(B)/k], hence nonextensive for q 1. In the present paper we illustrate the remarkable changes that occur when A and B are specially correlated. Indeed, we show that, in such case, Sq(A+B)=Sq(A)+Sq(B) for the appropriate value of q (hence extensive), whereas SBG(A+B) SBG(A)+SBG(B) (hence nonextensive).

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