C. Bahadoran and E. Saada—Supported by grant ANR-15-CE40-0020-02.
K. Ravishankar—Supported by Simons Foundation Collaboration grant 281207.
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References
Andjel, E.D.: Invariant measures for the zero range process. Ann. Probab. 10(3), 525–547 (1982)
Andjel, E., Ferrari, P.A., Siqueira, A.: Law of large numbers for the asymmetric exclusion process. Stoch. Process. Appl. 132(2), 217–233 (2004)
Andjel, E.D., Kipnis, C.: Derivation of the hydrodynamical equation for the zero range interaction process. Ann. Probab. 12, 325–334 (1984)
Andjel, E.D., Vares, M.E.: Hydrodynamic equations for attractive particle systems on \(\mathbb{Z}\). J. Stat. Phys. 47(1/2), 265–288 (1987) Correction to: “Hydrodynamic equations for attractive particle systems on \(Z\). J. Stat. Phys. 113(1-2), 379–380 (2003)
Bahadoran, C.: Blockage hydrodynamics of driven conservative systems. Ann. Probab. 32(1B), 805–854 (2004)
Bahadoran, C., Guiol, H., Ravishankar, K., Saada, E.: A constructive approach to Euler hydrodynamics for attractive particle systems. Application to \(k\)-step exclusion. Stoch. Process. Appl. 99(1), 1–30 (2002)
Bahadoran, C., Guiol, H., Ravishankar, K., Saada, E.: Euler hydrodynamics of one-dimensional attractive particle systems. Ann. Probab. 34(4), 1339–1369 (2006)
Bahadoran, C., Guiol, H., Ravishankar, K., Saada, E.: Strong hydrodynamic limit for attractive particle systems on \(\mathbb{Z}\). Electron. J. Probab. 15(1), 1–43 (2010)
Bahadoran, C., Guiol, H., Ravishankar, K., Saada, E.: Euler hydrodynamics for attractive particle systems in random environment. Ann. Inst. H. Poincaré Probab. Statist. 50(2), 403–424 (2014)
Bahadoran, C., Mountford, T.S., Ravishankar, K., Saada, E.: Supercriticality conditions for the asymmetric zero-range process with sitewise disorder. Braz. J. Probab. Stat. 29(2), 313–335 (2015)
Bahadoran, C., Mountford, T.S., Ravishankar, K., Saada, E.: Supercritical behavior of zero-range process with sitewise disorder. Ann. Inst. H. Poincaré Probab. Statist. 53(2), 766–801 (2017)
Bahadoran, C., Mountford, T.S., Ravishankar, K., Saada, E.: Hydrodynamics in a condensation regime: the disordered asymmetric zero-range process. Ann. Probab. (to appear). arXiv:1801.01654
Bahadoran, C., Mountford, T.S., Ravishankar, K., Saada, E.: Quenched convergence and strong local equilibrium for asymmetric zero-range process with site disorder. Probab. Theory Relat. Fields. published online 17 May 2019. https://doi.org/10.1007/s00440-019-00916-2
Ballou, D.P.: Solutions to nonlinear hyperbolic Cauchy problems without convexity conditions. Trans. Am. Math. Soc. 152, 441–460 (1970)
Benassi, A., Fouque, J.P.: Hydrodynamical limit for the asymmetric exclusion process. Ann. Probab. 15, 546–560 (1987)
Benjamini, I., Ferrari, P.A., Landim, C.: Asymmetric processes with random rates. Stoch. Process. Appl. 61(2), 181–204 (1996)
Bramson, M., Mountford, T.: Stationary blocking measures for one-dimensional nonzero mean exclusion processes. Ann. Probab. 30(3), 1082–1130 (2002)
Bressan, A.: Hyperbolic Systems of Conservation Laws: The One-Dimensional Cauchy Problem. Oxford Lecture Series in Mathematics, vol. 20. Oxford University Press, Oxford (2000)
Cocozza-Thivent, C.: Processus des misanthropes. Z. Wahrsch. Verw. Gebiete 70(4), 509–523 (1985)
Dai Pra, P., Louis, P.Y., Minelli, I.: Realizable monotonicity for continuous-time Markov processes. Stoch. Process. Appl. 120(6), 959–982 (2010)
De Masi, A., Presutti, E.: Mathematical Methods for Hydrodynamic Limits. Lecture Notes in Mathematics, vol. 1501. Springer, Heidelberg (1991)
Evans, M.R.: Bose-Einstein condensation in disordered exclusion models and relation to traffic flow. Europhys. Lett. 36(1), 13–18 (1996)
Fajfrovà, L., Gobron, T., Saada, E.: Invariant measures of Mass Migration Processes. Electron. J. Probab. 21(60), 1–52 (2016)
Fill, J.A., Machida, M.: Stochastic monotonicity and realizable monotonicity. Ann. Probab. 29(2), 938–978 (2001)
Fristedt, B., Gray, L.: A Modern Approach to Probability Theory. Probability and its Applications. Birkhäuser, Boston (1997)
Glimm, J.: Solutions in the large for nonlinear hyperbolic systems of equations. Commun. Pure Appl. Math. 18, 697–715 (1965)
Gobron, T., Saada, E.: Couplings, attractiveness and hydrodynamics for conservative particle systems. Ann. Inst. H. Poincaré Probab. Statist. 46(4), 1132–1177 (2010)
Godlewski, E., Raviart, P.A.: Hyperbolic systems of conservation laws. Mathématiques & Applications, Ellipses (1991)
Guiol, H.: Some properties of \(k\)-step exclusion processes. J. Stat. Phys. 94(3–4), 495–511 (1999)
Harris, T.E.: Nearest neighbor Markov interaction processes on multidimensional lattices. Adv. Math. 9, 66–89 (1972)
Harris, T.E.: Additive set-valued Markov processes and graphical methods. Ann. Probab. 6, 355–378 (1978)
Kamae, T., Krengel, U.: Stochastic partial ordering. Ann. Probab. 6(6), 1044–1049 (1978)
Kipnis, C., Landim, C.: Scaling limits of interacting particle systems. Grundlehren der Mathematischen Wissenschaften [Fundamental Principles of Mathematical Sciences], 320. Springer–Verlag, Berlin, (1999)
Kružkov, S.N.: First order quasilinear equations with several independent variables. Math. URSS Sb. 10, 217–243 (1970)
Liggett, T.M.: Coupling the simple exclusion process. Ann. Probab. 4(3), 339–356 (1976)
Liggett, T.M.: Interacting Particle Systems. Classics in Mathematics (Reprint of first edition). Springer-Verlag, New York (2005)
Liggett, T.M., Spitzer, F.: Ergodic theorems for coupled random walks and other systems with locally interacting components. Z. Wahrsch. Verw. Gebiete 56(4), 443–468 (1981)
Mountford, T.S., Ravishankar, K., Saada, E.: Macroscopic stability for nonfinite range kernels. Braz. J. Probab. Stat. 24(2), 337–360 (2010)
Rezakhanlou, F.: Hydrodynamic limit for attractive particle systems on \( \mathbb{Z}^d\). Commun. Math. Phys. 140(3), 417–448 (1991)
Rezakhanlou, F.: Continuum limit for some growth models. II. Ann. Probab. 29(3), 1329–1372 (2001)
Rost, H.: Nonequilibrium behaviour of a many particle process: density profile and local equilibria. Z. Wahrsch. Verw. Gebiete 58(1), 41–53 (1981)
Seppäläinen, T., Krug, J.: Hydrodynamics and Platoon formation for a totally asymmetric exclusion model with particlewise disorder. J. Stat. Phys. 95(3–4), 525–567 (1999)
Seppäläinen, T.: Existence of hydrodynamics for the totally asymmetric simple \(K\)-exclusion process. Ann. Probab. 27(1), 361–415 (1999)
Serre, D.: Systems of Conservation Laws. 1. Hyperbolicity, Entropies, Shock Waves. Cambridge University Press, Cambridge (1999). Translated from the 1996 French original by I. Sneddon
Spohn, H.: Large Scale Dynamics of Interacting Particles. Theoretical and Mathematical Physics. Springer, Heidelberg (1991)
Strassen, V.: The existence of probability measures with given marginals. Ann. Math. Stat. 36(2), 423–439 (1965)
Swart, J.M.: A course in interacting particle systems. staff.utia.cas.cz/swart/lecture_notes/partic15_1.pdf
Vol’pert, A.I.: The spaces \({\rm BV}\) and quasilinear equations. Math. USSR Sbornik 2(2), 225–267 (1967)
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Bahadoran, C., Guiol, H., Ravishankar, K., Saada, E. (2019). Constructive Euler Hydrodynamics for One-Dimensional Attractive Particle Systems. In: Sidoravicius, V. (eds) Sojourns in Probability Theory and Statistical Physics - III. Springer Proceedings in Mathematics & Statistics, vol 300. Springer, Singapore. https://doi.org/10.1007/978-981-15-0302-3_3
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