[20] 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. pp 43--89. Springer, Singapore.
hal-01447200.

[19] Echenim M., Guiol H., Peltier N. (2019)
Formalizing the Cox-Ross-Rubinstein pricing of European derivatives in Isabelle/HOL.
J Autom Reasoning pp 1--29.
https://doi.org/10.1007/s10817-019-09528-w
hal-01954948v1.

[18] Bahadoran, C., Guiol, H., Ravishankar, K. and Saada E. (2014).
Euler hydrodynamics for attractive particle systems in random environment.
Annales de l'I.H.P. Probabilités et statistiques, Tome 50 no. 2 , p. 403--424.

[17] Guiol, H., Machado, F. P. and Schinazi, R. B. (2013)
On a link between a species survival time in an evolution model and the Bessel distributions
Braz. J. Probab. Stat. Vol. 27, No 2, 201--209.

[16] Guiol, H., Machado, F. P. and Schinazi, R. B. (2011).
A stochastic model of evolution.
Markov Processes Relat. Fields. Vol 17, 253--258.

[15] Bahadoran, C., Guiol, H., Ravishankar, K. and Saada E. (2010).
Strong hydrodynamic limit for attractive particle systems on Z.
Electronic Journal of Probability. Vol 15, Paper no.1, 1--43.

[14] Guiol, H., Mountford, T. (2006)
Questions for second class particles in exclusion processes.
Proceedings of the Inhomogeneous Random Systems meeting.
Markov Processes and Related Fields. Vol. 12, No. 3, 301--308.

[13] Bahadoran, C., Guiol, H., Ravishankar, K., and Saada E. (2006).
Euler Hydrodynamics of one-dimensional attractive particle systems.
Annals of Probability. Vol 34, No. 4, 1339--1369.

[12] Andjel, E.D.,Guiol, H. (2005)
Long range exclusion processes, generator and invariant measures.
Annals of Probability. Vol 33, No. 6, 2314-2354.

[11] Mountford, T., Guiol, H. (2005)
The motion of a second class particle for the TASEP starting from a decreasing shock profile.
Annals of Applied Probability. Vol 15, No. 2, 1227--1259.

[10] Guiol, H. (2004)
About the long range exclusion process.
Proceedings of the ``Gibbs vs Non Gibbs" Conference, EURANDOM,
Markov Processes and Related Fields. Vol 10, 457--476.

[9] Guiol, H., Ravishankar, K. and Saada, E. (2003)
Microscopic structure of a decreasing shock for the asymmetric k-step exclusion process.
Electronic Communication in Probability. Vol 8, 170--178.

[8] Freire, M.V., Guiol, H., Ravishankar, K. and Saada, E. (2002)
Microscopic structure of the $k$-step exclusion process.
Bulletin of the Brazilian Mathematical Society. Vol 33, No. 3, 25--45.

[7] Bahadoran, C., Guiol, H., Ravishankar, K. and Saada, E. (2002)
A constructive approach to Euler hydrodynamics for attractive processes. Application to $k$-step exclusion.
Stochastic Processes and their Applications. Vol 99, No. 1, 1--30.

[6] Andjel, E.D., Ferrari, P.A., Guiol, H. and Landim C. (2000).
Convergence to the maximal invariant measure in zero range process with random rates.
Stochastic Processes and their Applications. Vol 90, No. 1, 67--81.

[5] Koukkous, A. and Guiol, H. (2000)
Large deviations for a zero mean asymmetric zero range process in random media.
23 pages, RP 16/00 IMECC-UNICAMP.
https://arxiv.org/abs/math/0009110

[4] Guiol, H. (1999)
Some properties of k-step exclusion processes.
Journal of Statistical Physics. Vol 94, No 3/4, 495--511.

[3] Galves, A. and Guiol, H. (1997)
Relaxation time to equilibrium of the one-dimensional symmetric zero range process with constant rate.
Markov Processes and Related Fields. Vol 3, No 3, 323--332 .

[2] Guiol, H. (1997)
A note on a Burton-Keane's theorem.
Technical Report RT-MAE {\bf 9707} IME-USP.

[1] Guiol, H. (1997)
Un résultat pour le Processus d'Exclusion à Longue Portée.
Annales de l'Institut Henri Poincaré: B, Probabilités et Statistiques. Vol 33, No 4, 387--405.

[0] Guiol, H. (1995)
Etude des processus d'exclusion à $k$ étapes et à longue portée.
PhD Thesis. Université de Provence, Aix-Marseille I.