The basic aspects of both Boltzmann-Gibbs (BG) and nonextensive statistical
mechanics can be seen through three different stages. First, the proposal of an
entropic functional
  ($S_{BG} =-k\sum_i p_i \ln p_i$ for the BG formalism) with the appropriate
constraints
  ($\sum_i p_i=1$ and $\sum_i p_i E_i = U$ for the BG canonical ensemble).
Second, through optimization, the equilibrium or stationary-state distribution
  ($p_i = e^{-\beta E_i}/Z_{BG}$ with $Z_{BG}=\sum_j e^{-\beta E_j}$ for BG).
Third, the connection to thermodynamics (e.g., $F_{BG}= -\frac{1}{\beta}\ln
Z_{BG}$ and
  $U_{BG}=-\frac{\partial}{\partial \beta} \ln Z_{BG}$). Assuming temperature
fluctuations,
  Beck and Cohen recently proposed a generalized Boltzmann factor
  $B(E) = \int_0^\infty d\beta f(\beta) e^{-\beta E}$. This corresponds to the
second stage above described. In this letter we solve the corresponding first
stage, i.e., we present an entropic functional and its associated constraints
which lead precisely to
  $B(E)$. We illustrate with all six admissible examples given by Beck and
Cohen.Comment: 3 PS figure

Souza, Andre M. C.

Tsallis, Constantino

English

arXiv

The basic aspects of both Boltzmann-Gibbs (BG) and nonextensive statistical mechanics can be seen through three different stages. First, the proposal of an entropic functional (SBG=-k∑ipilnpi for the BG formalism) with the appropriate constraints (∑ipi=1 and ∑ipiEi=U for the BG canonical ensemble). Second, through optimization, the equilibrium or stationary-state distribution (pi=e-βEi/ZBG with ZBG=∑je-βEj for BG). Third, the connection to thermodynamics (e.g., FBG=-(1/β)lnZBG and UBG=-(∂/∂β)lnZBG). Assuming temperature fluctuations, Beck and Cohen recently proposed a generalized Boltzmann factor B(E)=∫0∞dβf(β)e-βE. This corresponds to the second stage described above. In this paper, we solve the corresponding first stage, i.e., we present an entropic functional and its associated constraints which lead precisely to B(E). We illustrate with all six admissible examples given by Beck and Cohen

Souza, André Maurício Conceição de

Repositório Institucional da Universidade Federal de Sergipe

PHYSICAL REVIEW E 67, 026106 ~2003!Constructing a statistical mechanics for Beck-Cohen superstatisticsConstantino Tsallis1,* and Andre M. C. Souza1,2,†1Centro Brasileiro de Pesquisas Fı´sicas, Rua Xavier Sigaud 150, 22290-180 Rio de Janeiro-RJ, Brazil2Departamento de Fı´sica, Universidade Federal de Sergipe, 49100-000 Sa˜o Cristóvão-SE, Brazil~Received 3 July 2002; published 6 February 2003!The basic aspects of both Boltzmann-Gibbs~BG! and nonextensive statistical mechanics can be seenthrough three different stages. First, the proposal of an entropic functional (SBG52k( i pi ln pi for the BGformalism! with the appropriate constraints (( i pi51 and( i piEi5U for the BG canonical ensemble!. Second,through optimization, the equilibrium or stationary-state distribution (pi5e2bEi/ZBG with ZBG5( je2bEj forBG!. Third, the connection to thermodynamics~e.g.,FBG52(1/b)ln ZBG andUBG52(]/]b)ln ZBG). Assum-ing temperature fluctuations, Beck and Cohen recently proposed a generalized Boltzmann factorB(E)5*0`db f (b)e2bE. This corresponds to the second stage described above. In this paper, we solve the corre-sponding first stage, i.e., we present an entropic functional and its associated constraints which lead preciselyto B(E). We illustrate with all six admissible examples given by Beck and Cohen.DOI: 10.1103/PhysRevE.67.026106 PACS number~s!: 05.70.Ln, 05.20.Gg, 05.70.Cedyinthe-mten-rinybaathib-foronThe foundation of statistical mechanics and thermonamics is a fascinating and subtle matter. Its far reachconsequences have attracted deep attention since moreone century ago~see, for instance, Einstein’s remark on tBoltzmann principle@1#!. The field remains open to new proposals focusing nonequilibrium stationary states, such astaequilibrium and others. One of such proposals is nonexsive statistical mechanics, advanced in 1988@2,3# ~see Ref.@4# for reviews!. This formalism is based on an entropic idex q ~which recovers usual statistical mechanics forq51), and has been applied to a variety of systems, covecertain classes of both~meta!equilibrium and nonequilibriumphenomena, e.g., turbulence@5#, hadronic jets produced belectron-positron annihilation@6#, cosmic rays@7#, motion ofHydra viridissima @8#, quantum chaos@9#, and one-dimensional@10# and two-dimensional@11# maps, amongothers. In addition to this, it has been noted that it couldappropriate for handling some aspects of long-range intering Hamiltonian systems~see Ref. @12#, and referencestherein!.Let us be more precise. Nonextensive statistical mechics is based on the entropic form~here written forW discreteevents!Sq5k12(i 51Wpiqq21 S (i 51Wpi51;qPRD , ~1!withS15SBG52k(i 51Wpi ln pi . ~2!If we focus on the canonical ensemble~system in contactwith a thermostat!, we must add the following constraint@3#:*Email address: tsallis@cbpf.br†Email address: amcsouza@ufs.br1063-651X/2003/67~2!/026106~5!/$20.00 67 0261-ghane-n-gect-n-(i 51WpiqEi(i 51Wpiq5Uq ~U15UBG!, ~3!where$Ei% is the set of eigenvalues of the Hamiltonian wigiven boundary conditions. OptimizingSq , we straightfor-wardly obtain the distribution corresponding to the equilrium, metaequilibrium, or stationary state, namely,pi5@12~12q!bq~Ei2Uq!#1/(12q)Z̄q, ~4!withZ̄q5(j 51W@12~12q!bq~Ej2Uq!#1/(12q), ~5!andbq5b(j 51Wpjq, ~6!b being the Lagrange parameter. We easily verify that,q51, we recover the celebrated BG equilibrium distributipi5e2bEiZBG, ~7!withZBG5(j 51We2bEj . ~8!©2003 The American Physical Society06-1th,-enlualpwe-mlareatate-ntortyen-e.ef., in-siveumturee ofes-onC. TSALLIS AND A. M. C. SOUZA PHYSICAL REVIEW E67, 026106 ~2003!Very recently, Beck and Cohen have proposed@13# a gener-alization of the BG factor. More precisely, assuming thatinverse temperatureb might itself be a stochastic variablethey advanceB~E!5E0`db8 f ~b8!e2b8E, ~9!where the distributionf (b8) satisfiesE2``db8 f ~b8!51. ~10!It is clear thatf (b8)5d(b82b) recovers the usual BG factor. They have also shown that, iff (b8) is the g ~or x2)distribution, then the distribution associated with nonextsive statistical mechanics is reobtained. They have also iltrated their proposal with the uniform, bimodal, log-normand F distributions. Moreover, they define~see also Ref.@14#!qBC5^b2&^b&2S ^•••&[E2``db f ~b!~••• ! D , ~11!where we have introduced the notationqBC in order to avoidconfusion with the presentq. Clearly, if f (b8) is theg dis-tribution, thenqBC5q ~see Ref.@13#!. Finally, they arguethat wheneveruqBC21u!1, for all admissiblef (b), we canwrite the asymptotic expressionB(E)5^e2bE&.e2^b&E(11s2E2/2), wheres25^b2&2^b&2. This expression coin-cides with the expansion of the power-law function that reresents the generalized Boltzmann factor associatednonextensive statistical mechanics if we use Eq.~11! andidentify qBC5q. In other words, nonextensive statistical mchanics would correspond, for this particular mechaniswhere nonextensivity is driven by the fluctuations ofb, tothe universal behavior whenever the fluctuations are retively small.This is no doubt a very deep and interesting result,bu itdoes not constitute by itself a statistical mechanics. Theson is that the factorB(E) has been introduced through whcan, in some sense, be considered as anad hocprocedure.The basic element which is missing in order to be legitimto speak of a statistical-mechanical formalism is to be ablderivethe factorB(E) from an entropic functional with concrete constraints~and especially the energetic constraiwhich generates the concept of thermostat temperature!. Thpurpose of the present paper is to exhibit such entropic fand constraint.Let us first write a quite generic entropic form~from nowon k51 for simplicity!, namely,S5(i 51Ws~pi ! @s~x!>0;s~0!5s~1!50#. ~12!For the BG entropySBG , we haves(x)52x ln x, and for thenonextensive oneSq , we haves(x)5(x2xq)/(q21). The02610e-s-,-ith,-a-eto,mfunction s(x) should generically have a definite concavi;xP@0,1#. Conditions~12! imply that S>0 and that cer-tainty corresponds toS50.Let us now address the constraint associated with theergy. We consider the following form:(i 51Wu~pi !Ei(i 51Wu~pi !5U @0<u~x!<1;u~0!50;u~1!51#.~13!For the BG internal energyUBG , we haveu(x)5x, and forthe nonextensive oneUq , we haveu(x)5xq. The functionu(x) should generically be a monotonically increasing onCertainty about Ej implies U5Ej . The quantityu(pi)/( j 51W u(pj ) constitutes itself a probability distribution~which generalizes the escort distribution defined in R@15#!. The constraint associated with the energy appliesprinciple, for the~meta!equilibrium state. However, its validity ~either exact or approximate! has been verified in variounonequilibrium stationary states related with nonextensstatistical mechanics~e.g., turbulence@5#, granular matter@18#!. For example, we may interpret the energy spectrused in the constraint in the same spirit as the temperaused by Beck and Cohen. It represents the mean valusome fluctuation distribution. The general foundational qution and its possible geometrical interpretation~i phasespace! remain, nevertheless, open.Let us consider now the functionalF[S2a(i 51Wpi2b(i 51Wu~pi !Ei(i 51Wu~pi !, ~14!where a and b are Lagrange parameters. The conditi]F/]pj50 impliess8~pj !2a2b(i 51Wu~pi !u8~pj !~Ej2U !50. ~15!Let us now heuristically assumeu8~x!5m1ns8~x!, ~16!u~x!5mx1ns~x!1j. ~17!But the conditions(0)5u(0)50 impliesj50, and the con-ditions s(1)50 andu(1)51 imply thatm51, hence,u~x!5x1ns~x! ~18!andu8~x!511ns8~x!. ~19!6-2blensatarofestialbmlinealltq.deticereef.n-.l--eCONSTRUCTING A STATISTICAL MECHANICS FOR . . . PHYSICAL REVIEW E 67, 026106 ~2003!Observe that ifn50, we haveu(x)5x and ( j 51W u(pj )5( j 51W pj51.The replacement of Eq.~19! into Eq. ~15! yieldss8~pi !5a1bEi2U(j 51Wu~pj !12bnEi2U(j 51Wu~pj !, ~20!hencepi5~s8!21S a1b Ei2U(j 51W u~pj !12bn Ei2U(j 51Wu~pj !D , ~21!where (s8)21(•••) is the inverse function ofs8(•••). Thecondition ( i 51W pi51 enables the~analytical or numerical!elimination of the Lagrange parametera. The function~21!is to be identified withB(E)/*0`dE8B(E8) from Ref.@13#. Inother words, if E(y) is the inverse function ofB(E)/*0`dE8B(E8), we have thats~x!5E0xdya1bE~y!2U(j 51Wu~pj !12bnE~y!2U(j 51Wu~pj !, ~22!which, together with Eq.~18!, completely solves the problemonce n is determined. Summarizing, given an admissifunction B(x), we have uniquely determined the functios(x) andu(x), which replaced into Eqs.~12! and ~13! con-cludes the formulation of the statistical mechanics associwith the Beck-Cohen superstatistics. An important remremains to be made, namely,any monotonic function ofSgiven by Eq.~12! also is a solution at this stage. Whichthose is to be retained for a possible connection with thmodynamics is a different matter, and remains an open isat the present stage. For example, for nonextensive statismechanics, in what concerns the stationary distribution,Sqand the Renyi entropySqR5 ln@11(12q)Sq#/(12q) areequivalent. In other words,at this level, we could indistinc-tively useSq or SqR . There is, however, a variety of physicarguments which are out of scope of the present workwhich nevertheless point, in that particular case,Sq as beingthe correct physical quantity to be used for thermodyna02610edkr-uecaluticand dynamic purposes. A strong argument along thisconcerns the stability of the entropy under arbitrarily smdeformation of the statistical state probabilities@16#. For in-stance, Abe@17# and Lesche@16#, respectively, showed thaSq is stable andSqR is unstable.Let us now compare theB(E) factor obtained by Beck-Cohen formalism with the distribution presented here in E~21!. In addition to the fact that the former does not incluthe normalization constant whereas the latter does, we nothat theB(E) factor has parameters such asb0[^b&, insteadof the parametersa, U, n, andb/( jWu(pj ) @generalizationof Eq. ~6!# appearing in Eq.~21!. This problem will behandled as follows. Since our aim is to determine thefunc-tional formsof s(x) andu(x), it is enough to work with onlyone variable. So, we takeb05b/( jWu(pj )51 and U50.Let us now determinen. Using Eqs.~15! and~19!, and inte-grating, we obtainu~x!5~11an!E0x dy12nE~y!. ~23!It is physically reasonable to assume thatu(x) monotonicallyincreases withx, hencedu/dx>0, and (1 an)/(12nE)>0. We shall verify later that 1 an.0, hence it must ben<1/E. If we noteE* , the lowest admissible value ofE, weare allowed to considern51/E* . In particular, if E* →2`, then it must ben50. An example whereE* is finite isnonextensive statistical mechanics withq.1. In this case,E* 51/(12q), hencen512q. We can trivially verify thatthis value forn, together withs(x)5(x2xq)/(q21) andu(x)5xq precisely satisfy Eq.~18!.Summarizing, the final form ofu(x) is given byu~x!5~11a/E* !E0x dy12E~y!/E*, ~24!and, therefore,s~x!5E0xdya1E~y!12E~y!/E*. ~25!In what follows, we shall illustrate the above proceduby addressingall the admissible examples appearing in R@13#. The cases associated with the Diracd and theg distri-butions forf (b) ~respectively corresponding to BG and noextensive statistical mechanics! can be handled analyticallyThe other four cases@uniform, bimodal, log-normal, andFdistributions forf (b)] have been treated numerically as folows. We first choosef (b), then calculateB(E), and fromthis calculate*0`dE8B(E8). By inverting the axes of thevariables, we find the inverseE(y) of Beck-Cohen superstatistics. From this, we obtainE* . Two cases are possible. Thfirst one corresponds toE* →2`, hencen50, u(x)5x,and s(x)5ax1*0xdyE(y). The conditions(1)50 deter-minesa, which is therefore given bya52*01dyE(y). Thesecond case corresponds to a finite and known value ofE* ,which determines n51/E* . From this, we calculate*0xdy/@12E(y)/E* #. From the conditionu(1)51 and using6-3pfinairseTheticalaria-bleskforsnse,ig-sultsods-hisef.l-ndtedC. TSALLIS AND A. M. C. SOUZA PHYSICAL REVIEW E67, 026106 ~2003!Eq. ~24!, it is easy to see that 11an511a/E*51/*01dy/@12E(y)/E* #.0 and it is direct to determinea,which in turn enables the calculation ofu(x) using onceagain Eq.~24!. Finally, from Eq.~18!, we calculates(x), andthe problem is solved.In Figs. 1~a! and 1~b!, typical examples ofs(x) andu(x)are presented for all the cases addressed in Ref.@13#. In Fig.2, we show the entropies associated with all these examassumingW52.Let us conclude by saying that it has been possible toexpressions for the entropy and for the energetic constrthat lead to a generic Beck-Cohen superstatistics. Of couFIG. 1. Functionss(x) ~a! and u(x) ~b! for illustrative ex-amples of the cases focused on in Ref.@13#. From top to bottom:~i! F distribution @ f (b)524/(21b)4#; ~ii ! bimodal @ f (b)50.5d(b21/2)10.5d(b23/2)#; ~iii ! log normal @ f (b)5(1/bA2p)e2[(0.51 ln b)2/2]#; ~iv! uniform @ f (b)51 on the interval@1/2,3/2#, and zero otherwise#; ~v!Dirac d @ f (b)5d(b21)#; ~vi!g @ f (b)5@(b)0.25/(0.8)1.25G(1.25)#e21.25b#, which corresponds toq51.8.02610lesdnte,similar considerations are valid for other constraints if wwere focusing on say the grandcanonical ensembles.step we have discussed is necessary for having the statismechanics generating these superstatistics through a vtional principle. What remains to be done is the possiconnection with thermodynamics. This is not a trivial tabecause unless we are dealing with a nonlinear power lawu(x) ~which precisely is nonextensive statistical mechanic!,the Lagrange parametera is not factorizable in Eq.~21!,hence no partition function can be defined in the usual sei.e., a partition function which depends onb ~and otheranalogous parameters!, but doesnot depend ona. Summa-rizing, nonextensive statistical mechanics not only paradmatically represents, as shown in Ref.@13#, the universalbehavior of all Beck-Cohen superstatistics in the limitqBC.q.1, but it is the only one for which ana-independentpartition function can be defined.Last but not least, let us emphasize that the present restrengthen the idea that the statistical-mechanical methcan bein principle used out of equilibrium as well. To bemore specific, we can think of using them~i! in equilibrium~e.g., in thet→` limit of noninteracting or short-range interacting Hamiltonians, as well as in the limN→`limt→` oflong-range interacting many-body Hamiltonian systems; tis essentially BG statistical mechanics!, ~ii ! in metaequilib-rium ~e.g., in the limt→`limN→` of long-range interactingmany-body Hamiltonian systems; see, for instance, R@12#!, and ~iii ! for appropriate classes ofstationary states~see, for instance, Refs.@5,18#!. Further foundational workwould be welcome for case~iii !.Useful remarks from F. Baldovin are gratefully acknowedged. Partial support from PCI/MCT, CNPq, PRONEX, aFAPERJ~Brazilian agencies! is also acknowledged.FIG. 2. W52 entropies associated with the examples presenin Fig. 1.6-4tobouooineols-ntsicansis,.sCONSTRUCTING A STATISTICAL MECHANICS FOR . . . PHYSICAL REVIEW E 67, 026106 ~2003!@1# A. Einstein, Ann. Phys.~Leipzig! 33, 1275~1910!; @‘‘UsuallyW is put equal to the number of complexions. In ordercalculate W, one needs acomplete ~molecular-mechanical!theory of the system under consideration. Therefore it is duous whether the Boltzmann principle has any meaning witha complete molecular-mechanical theory or some other thewhich describes the elementary processes.S5(R/N)log W1const seems without content, from a phenomenological pof view, without giving in addition such anElementartheo-rie’’. #@2# C. Tsallis, J. Stat. Phys.52, 479~1988!; E.M.F. Curado and C.Tsallis, J. Phys. A24, L69 ~1991!; 24, 3187~1991!; 25, 1019~1992!. For a regularly updated bibliography of the subject, shttp://tsallis.cat.cbpf.br/biblio.htm@3# C. Tsallis, R.S. Mendes, and A.R. Plastino, Physica A261, 534~1998!.@4# S.R.A. Salinas and C. Tsallis, Braz. J. Phys.29, 1 ~1999!;Nonextensive Statistical Mechanics and Its Applications, ed-ited by S. Abe and Y. Okamoto, Lecture Notes in Physics V560 ~Springer-Verlag, Heidelberg, 2001!; P. Grigolini, C. Tsal-lis, and B.J. 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Constructing a statistical mechanics for Beck-Cohen superstatistics

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