Thermodynamic formalism and large deviations for multiplication-invariant potentials on lattice spin systems

Jean-René Chazottes (CNRS & École Polytechnique)
Frank Redig (Delft University of Technology)

Abstract


We introduce the multiplicative Ising model and prove basic properties of its thermodynamic formalism such as existence of pressure and entropies. We generalize to one-dimensional "layer-unique'' Gibbs measures for which the same results can be obtained. For more general models associated to a $d$-dimensional multiplicative invariant potential, we prove a large deviation theorem in the uniqueness regime for averages of multiplicative shifts of general local functions. This thermodynamic formalism is motivated by the statistical properties of multiple ergodic averages.

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Pages: 1-19

Publication Date: April 1, 2014

DOI: 10.1214/EJP.v19-3189

References

  • Bryc, Włodzimierz. A remark on the connection between the large deviation principle and the central limit theorem. Statist. Probab. Lett. 18 (1993), no. 4, 253--256. MR1245694
  • Carinci, Gioia; Chazottes, Jean-René; Giardinà, Cristian; Redig, Frank. Nonconventional averages along arithmetic progressions and lattice spin systems. Indag. Math. (N.S.) 23 (2012), no. 3, 589--602. MR2948646
  • Dembo, Amir; Zeitouni, Ofer. Large deviations techniques and applications. Corrected reprint of the second (1998) edition. Stochastic Modelling and Applied Probability, 38. Springer-Verlag, Berlin, 2010. xvi+396 pp. ISBN: 978-3-642-03310-0 MR2571413
  • Dobrushin, R. L.; Shlosman, S. B. Completely analytical interactions: constructive description. J. Statist. Phys. 46 (1987), no. 5-6, 983--1014. MR0893129
  • Fan, Aihua; Schmeling, Jörg; Wu, Meng. Multifractal analysis of multiple ergodic averages. C. R. Math. Acad. Sci. Paris 349 (2011), no. 17-18, 961--964. MR2838244
  • Frantzikinakis, Nikos. The structure of strongly stationary systems. J. Anal. Math. 93 (2004), 359--388. MR2110334
  • Georgii, Hans-Otto. Gibbs measures and phase transitions. Second edition. de Gruyter Studies in Mathematics, 9. Walter de Gruyter & Co., Berlin, 2011. xiv+545 pp. ISBN: 978-3-11-025029-9 MR2807681
  • Hochman, M.: private communication.
  • Jenvey, E. Strong stationarity and de Finetti's theorem. J. Anal. Math. 73 (1997), 1--18. MR1616457
  • Kifer, Yuri; Varadhan, S. R. S. Nonconventional large deviations theorems. Probab. Theory Related Fields 158 (2014), no. 1-2, 197--224. MR3152784
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