Complete and updated list at [MathSciNet]


Publications 2009-2011*

  1. Ferrari, P.A.; Pechersky, E.; Sisko, V.; Yambartsev, A. Gibbs Random Graphs. Journal of Mathematical Physics (2010), v. 51, 113303.
  2. Skinner, Jeff; Kotliarov, Yuri; Varma, Sudhir; Mine, Karina L; Yambartsev, Anatoly; Simon, Richard; Huyen, Yentram; Morgun, Andrey. Construct and Compare Gene Coexpression Networks with DAPfinder and DAPview. BMC Bioinformatics 12 (2011), p. 286.
  3. Colo, A.; Simoes, A. C. Q.; Carvalho, A. L; Melo, C. M.; Fahham, L.; Kowalski, L. P; Soares, F. A.; Neves, E. Jordão; Reis, L. F. L.; Carvalho, A. F. Functional microarray analysis suggests repressed cell-cell signaling and cell survival-related modules inhibit progression of head and neck squamous cell carcinoma. BMC Medical Genomics 4 (2011), p. 33.
  4. Cunha, I. W. DA; Carvalho, K. C.; Martins, W. K.; Muto, N. H.; Falzoni, R.; Rocha, R. M.; Simoes, A. C. Q; Neves, E. Jordão; Soares, F. A.; REIS, L. F. Identification of genes associated with local aggressiveness and metastatic behavior in soft tissue tumors. Translational Oncology 3 (2010), p. 23-32.
  5. Meireles, S. I.; Esteves, G. H.; Hirata, R.; Peri, S.; Devarajan, K.; Slifker, M.; Mosier, S. L.; Peng, J.; Vadhanam, M. V.; Hurst, H. E.; Neves, E. Jordão; Reis, L. F. L.; Gairola, C. G.; Gupta, R. C.; Clapper, M. L. Early Changes in Gene Expression Induced by Tobacco Smoke: Evidence for the Importance of Estrogen within Lung Tissue. Cancer Prevention Research 3 (2010), p. 707-717.
  6. Lebensztayn, E.; Machado, F.P.; Rodríguez, P.M. Limit theorems for a general stochastic rumour model. SIAM Journal on Applied Mathematics 71 (2011), p.~1476--1486.
  7. Lebensztayn, E.; Machado, F.P.; Rodríguez, P.M. On the behaviour of a rumour process with random stifling. Environmental Modelling and Software 26 (2011), p.~517--522.
  8. Guiol, H; Machado, F.P. and Schinazi, R. A stochastic model of evolution. Markov Processes and Related Fields 17 (2011), p. 253-258.
  9. Machado, F.P.; Mashurian, H. e Matzinger, H. CLT for the proportion of infected individuals for an epidemic model on a complete graph. Markov Process and Related Fields 17 (2011), p. 209-224.
  10. Junior, V.V; Machado, F.P. and Zuluaga, M. Rumour Processes on N. Journal of Applied Probability 48 (2011), Number 3, 624-636.
  11. Schütz; Prado. Loss of ergodicity in the transition from annealed to quenched disorder in a finite kinetic Ising model. Journal of Statistical Physics 142 (2011), p. 984-999.
  12. Belitsky; Pereira; Prado. Stability analysis with applications of a two-dimensional dynamical system arising from a stochastic model for an asset market. Stochastic and Dynamics 11 (2011), No. 4, p. 715-752.
  13. Gallesco, C.; Müller, S.; Popov, S.; Vachkovskaia, M. Spiders in random environment. ALEA - Latin American Journal of Probability and Mathematical Statistics 8 (2011), 129--147.
  14. Pachón, A.; Popov, S. Scenery reconstruction with branching random walk. Stochastics 83 (2011), 107--116.
  15. BELITSKY, V.; Schütz, G. M. Microscopic position and structure of a shock in CA 184. Journal of Physics A: Mathematical and Theoretical 44 (2011), Nr.~44, 5003.
  16. BELITSKY, V.; Schütz, G. M. Cellular automaton model for molecular traffic jams. Journal of Statistical Mechanics 2011 (2011), p. P07007.
  17. Coletti, Cristian F.; Tisseur, Pierre. Invariant measures and decay of correlations for a class of ergodic probabilistic cellular automata. J. Stat. Phys. 140 (2010), no. 1, 103-121
  18. Comets, Francis; Popov, Serguei; Schütz, Gunter M.; Vachkovskaia, Marina. Knudsen gas in a finite random tube: transport diffusion and first passage properties. J. Stat. Phys. 140 (2010), no. 5, 948-984
  19. Comets, Francis; Popov, Serguei; Schütz, Gunter M.; Vachkovskaia, Marina. Quenched invariance principle for the Knudsen stochastic billiard in a random tube. Ann. Probab. 38 (2010), no. 3, 1019-1061
  20. Lebensztayn, Elcio; Machado, Fabio Prates; Martinez, Mauricio Zuluaga. Nonhomogeneous random walks systems on Z. J. Appl. Probab. 47 (2010), no. 2, 562-571
  21. Bosco, G. G.; Machado, F. P.; Ritchie, Thomas Logan. Exponential rates of convergence in the ergodic theorem: a constructive approach. J. Stat. Phys. 139 (2010), no. 3, 367-374
  22. Fribergh, Alexander; Gantert, Nina; Popov, Serguei. On slowdown and speedup of transient random walks in random environment. Probab. Theory Related Fields 147 (2010), no. 1-2, 43-88
  23. Coletti, C. F.; Fontes, L. R. G.; Dias, E. S. Scaling limit for a drainage network model. J. Appl. Probab. 46 (2009), no. 4, 1184-1197
  24. Pechersky, E.; Yambartsev, A. Percolation properties of the non-ideal gas. J. Stat. Phys. 137 (2009), no. 3, 501-520
  25. Fernández, Roberto; Fontes, Luiz R.; Neves, E. Jordão. Density-profile processes describing biological signaling networks: almost sure convergence to deterministic trajectories. J. Stat. Phys. 136 (2009), no. 5, 875-901
  26. Comets, Francis; Popov, Serguei; Schütz, Gunter M.; Vachkovskaia, Marina. Erratum: Billiards in a general domain with random reflections. Arch. Ration. Mech. Anal. 193 (2009), no. 3, 737-738
  27. Comets, Francis; Popov, Serguei; Schütz, Gunter M.; Vachkovskaia, Marina. Billiards in a general domain with random reflections. Arch. Ration. Mech. Anal. 191 (2009), no. 3, 497-537
  28. Gantert, Nina; Popov, Serguei; Vachkovskaia, Marina. Survival time of random walk in random environment among soft obstacles. Electron. J. Probab. 14 (2009), no. 22, 569-593



* Source: MathSciNet