Asymptotically scale-invariant occupancy of phase space makes the entropy Sq extensive

Abstract

Phase space can be constructed for N equal and distinguishable subsystems that could be (probabilistically) either weakly (or "locally") correlated (e.g., independent, i.e., uncorrelated), or strongly (or globally) correlated. If they are locally correlated, we expect the Boltzmann-Gibbs entropy SBG -k Σi pi pi to be extensive, i.e., SBG(N) N for N ∞. In particular, if they are independent, SBG is strictly additive, i.e., SBG(N)=N SBG(1), ∀ N. However, if the subsystems are globally correlated, we expect, for a vast class of systems, the entropy Sq k [1- Σi piq]/(q-1) (with S1=SBG) for some special value of q1 to be the one which extensive (i.e., Sq(N) N for N ∞).

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