Tsallis entropy

In physics, the Tsallis entropy is a generalization of the standard Boltzmann-Gibbs entropy. It was an extension put forward by Constantino Tsallis in 1988. It is defined as

: $S_q(p) = {1 over q - 1} left( 1 - int p^q(x), dx
ight),$

or in the discrete case

: $S_q(p) = {1 over q - 1} left( 1 - sum_x p^q(x)
ight).$

In this case, "p" denotes the probability distribution of interest, and "q" is a real parameter. In the limit as "q" → 1, the normal Boltzmann-Gibbs entropy is recovered.

The parameter "q" is a measure of the non-extensitivity of the system of interest. There are continuous and discrete versions of this entropic measure.

Various relationships

The discrete Tsallis entropy satisfies

: $S_q = - left [ D_q sum_i p_i^x
ight ] _{x=1}$

where "D"_"q" is the q-derivative.

Non-extensivity

Given two independent systems "A" and "B", for which the joint probability density satisfies

: $p(A, B) = p(A) p(B),,$

the Tsallis entropy of this system satisfies

: $S_q(A,B) = S_q(A) + S_q(B) + (1-q)S_q(A) S_q(B).,$

From this result, it is evident that the parameter $|1-q|$ is a measure of the departure from extensivity. In the limit when "q" = 1,

: $S(A,B) = S(A) + S(B),,$

which is what is expected for an extensive system.

See also

*Rényi entropy

External links

* [http://www.cscs.umich.edu/~crshalizi/notabene/tsallis.html Tsallis Statistics, Statistical Mechanics for Non-extensive Systems and Long-Range Interactions]

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