Nous considérons le théorème de fluctuation-dissipation de la mécanique statistique dans une approche mathématique. Nous donnons un concept formel de la réponse linéaire dans le cadre général de la théorie des processus de Markov. Nous démontrons que pour un processus hors d'équilibre celle ci dépend non seulement du processus de Markov X(s) mais aussi de la perturbation choisie. Nous caractérisons l'ensemble de toutes les réponses possibles pour un processus de Markov donné et démontrons qu'à l'équilibre elles satisfassent toutes le théorème de fluctuation-dissipation. C'est à dire, si une mesure ν est invariante pour un semigroupe markovien donné, alors pour tout temps s<t et functions régulières f, g, la dissipation, definie comme la dérivée en s de la covariance de g(X(t)) et de f(X(s)) est égale à la réponse infinitésimale au temps t en direction de g pour toute perturbation markovienne qui modifie la mesure invariante ν en direction de f au temps s. Ce résultat s'étend au régime proche de l'équilibre, c.-à.-d. dans la limite s→∞ avec t-s fixe, en supposant que X(s) converge en loi vers sa mesure invariante. Nous donnons la réponse pour deux perturbations markoviennes génériques, que nous comparons ensuite pour des processus de sauts dans un espace discret, pour des diffusions à dimension finie et pour une dynamique stochastique de spins.
We consider the Fluctuation Dissipation Theorem (FDT) of statistical physics from a mathematical perspective. We formalize the concept of “linear response function” in the general framework of Markov processes. We show that for processes out of equilibrium it depends not only on the given Markov process X(s) but also on the chosen perturbation of it. We characterize the set of all possible response functions for a given Markov process and show that at equilibrium they all satisfy the FDT. That is, if the initial measure ν is invariant for the given Markov semi-group, then for any pair of times s<t and nice functions f, g, the dissipation, that is, the derivative in s of the covariance of g(X(t)) and f(X(s)) equals the infinitesimal response at time t and direction g to any markovian perturbation that alters the invariant measure of X(⋅) in the direction of f at time s. The same applies in the so-called FDT regime near equilibrium, i.e. in the limit s→∞ with t-s fixed, provided X(s) converges in law to an invariant measure for its dynamics. We provide the response function of two generic markovian perturbations which we then compare and contrast for pure jump processes on a discrete space, for finite-dimensional diffusion processes, and for stochastic spin systems.
Mots-clés : Markov processes, out of equilibrium statistical physics, Langevin dynamics, Dirichlet forms, fluctuation dissipation theorem
@article{AIHPB_2010__46_3_822_0, author = {Dembo, Amir and Deuschel, Jean-Dominique}, title = {Markovian perturbation, response and fluctuation dissipation theorem}, journal = {Annales de l'I.H.P. Probabilit\'es et statistiques}, pages = {822--852}, publisher = {Gauthier-Villars}, volume = {46}, number = {3}, year = {2010}, doi = {10.1214/10-AIHP370}, mrnumber = {2682268}, zbl = {1196.82092}, language = {en}, url = {http://archive.numdam.org/articles/10.1214/10-AIHP370/} }
TY - JOUR AU - Dembo, Amir AU - Deuschel, Jean-Dominique TI - Markovian perturbation, response and fluctuation dissipation theorem JO - Annales de l'I.H.P. Probabilités et statistiques PY - 2010 SP - 822 EP - 852 VL - 46 IS - 3 PB - Gauthier-Villars UR - http://archive.numdam.org/articles/10.1214/10-AIHP370/ DO - 10.1214/10-AIHP370 LA - en ID - AIHPB_2010__46_3_822_0 ER -
%0 Journal Article %A Dembo, Amir %A Deuschel, Jean-Dominique %T Markovian perturbation, response and fluctuation dissipation theorem %J Annales de l'I.H.P. Probabilités et statistiques %D 2010 %P 822-852 %V 46 %N 3 %I Gauthier-Villars %U http://archive.numdam.org/articles/10.1214/10-AIHP370/ %R 10.1214/10-AIHP370 %G en %F AIHPB_2010__46_3_822_0
Dembo, Amir; Deuschel, Jean-Dominique. Markovian perturbation, response and fluctuation dissipation theorem. Annales de l'I.H.P. Probabilités et statistiques, Tome 46 (2010) no. 3, pp. 822-852. doi : 10.1214/10-AIHP370. http://archive.numdam.org/articles/10.1214/10-AIHP370/
[1] Diffusions hypercontractives. In Séminaire de probabilités XIX 179-206. Lecture Notes is Math. 1123. Springer, Berlin, 1985. | Numdam | MR | Zbl
and .[2] Dirichlet Forms and Analysis on Wiener Space. de Gruyter, New York, 1991. | MR | Zbl
and .[3] Large Deviations, Reprint edition. Amer. Math. Soc., Providence, RI, 2001. | Zbl
and .[4] Hypercontractivity and spectral gap of symmetric diffusions with applications to the stochastic Ising models. J. Funct. Anal. 92 (1990) 30-48. | MR | Zbl
and .[5] Linear Operators, Part I: General Theory. Interscience, New York, 1958. | MR | Zbl
and .[6] Stochastic Calculus: A Practical Introduction. CRC Press, Boca Raton, FL, 1996. | MR | Zbl
.[7] Spectral properties of hypoelliptic operators. Comm. Math. Phys. 235 (2003) 233-257. | MR | Zbl
and .[8] On the motion of small particles suspended in liquids at rest required by the molecular-kinetic theory of heat. Ann. Physics (Leipzig) 17 (1905) 549-560. | JFM
.[9] Dirichlet Forms and Symmetric Markov Processes. de Gruyter, New York, 1994. | MR
, and .[10] Semigroups of Linear Operators and Applications. Oxford Univ. Press, New York, 1985. | MR | Zbl
.[11] Einstein relation for nonequilibrium steady states. J. Stat. Phys. 111 (2003) 1377-1390. | MR | Zbl
and .[12] Diffusions on the infinite dimensional torus. J. Funct. Anal. 42 (1981) 29-63. | MR | Zbl
and .[13] Hypoelliptic second order differential equations. Acta Math. 119 (1967) 147-171. | MR | Zbl
.[14] Differential transport coefficients and the fluctuation-dissipation theorem for non-equilibrium steady states. Phys. A 201 (1993) 626-648. | MR
.[15] Mathematical Theory of Nonequilibrium Steady States. Lecture Notes in Math. 1833. Springer, New York, 2004. | MR | Zbl
, and .[16] The fluctuation-dissipation theorem. Rep. Prog. Phys. 29 (1966) 255-284. | Zbl
.[17] Statistical Physics II, 2nd edition. Springer, Berlin, 1991. | MR | Zbl
, and .[18] Application of the Malliavin calculus, II. J. Fac. Sci. Univ. Tokyo IA Math. 32 (1985) 1-76. | MR | Zbl
and .[19] The Einstein relation for the displacement of a test particle in a random environment. Stochastic Process. Appl. 54 (1994) 183-196. | MR | Zbl
and .[20] Mobility and Einstein relation for a tagged particle in asymmetric mean zero random walk with simple exclusion. Ann. Inst. H. Poincaré Probab. Statist. 41 (2005) 237-254. | Numdam | MR | Zbl
.[21] Introduction to the Theory of (Non-Symmetric) Dirichlet Forms. Springer, Berlin, 1991. | Zbl
and .[22] Thermal agitation of electric charge in conductors. Phys. Rev. 32 (1928) 110-113.
.[23] Infinite dimensional stochastic differential equations and their applications. J. Math. Kyoto Univ. 20 (1980) 395-416. | MR | Zbl
and .Cité par Sources :