2007

  1. J. L. da Silva, M. Erraoui, H. Ouerdiane. Generalized Fractional Evolution Equation. Calc. Appl. Anal. 10-4, pp. 375--398, 2007. Download
  2. Yu. Kondratiev, Zhizhina. Spectral Analysis of Stochastic Ising model in continuum. J. Stat. Phys. 129 (2007), no. 1, 121--149. Download
  3. D. Finkelshtein, L. Dmitri, Yu. Kondratiev, E. Lytvynov. Equilibrium Glauber Dynamics of Continuos Particle systems. Random Oper. Stoch. Equ. 15 (2007), no. 2, 105--126. Download
  4. Yu. Kondratiev, E. Lytvynov, M. Rockner. Equilibrium Kawasaki Dynamics of Continuous Particle Systems. Relat. Top. 10 (2007), no. 2, 185--209. Download
2008
  1. C. Drumond, M. João Oliveira, José Luis da Silva. Intersection local times of fractional Brownian motions with H in (0,1) as generalized white noise functionals. Submitted to the 5th Jagna International Workshop Stochastic and Quantum Dynamics of biomolecular Systems, January 3–5, 2008, Jagna, Philippines. Download
  2. José Luis da Silva, Mohamed Erraoui, Habib Ouerdiane. Convolution Equation: Solution and Probabilistic Representation, 1-15 March 2008. Download
  3. Martin Grothaus, Ludwig Streit, Anna Vogel. Feynman Integrals as Hida Distributions: The Case of Non-Perturbative Potencials. Download. Astérisque No. 327 (2009), 55--68 (2010). ISBN: 978-2-85629-288-4.
  4. F. Conrad, M. Grothaus. N/V-Limit for Langevin dynamics in Continuum, subbmitted 2008. Download
  5. D.L. Finkelshtein. Measures on two-component configuration spaces, Preprint 2008. Download
  6. D. O. Filonenko, D. L. Finkelshtein and Yuri G. Kondratiev. On two-component contact model in continuum, Preprint 2008. Download
  7. Yu. Kondratiev, O. Kutoviy and S. Pirogov. Correlation Functions and Invariant Measures, Preprint 2008. Download
  8. D. Finkelshtein, Y. Kondratiev and E. Lytvynov. On convergence of dynamics of hopping particles to a birth-and-death process in continuum, Preprint 2008. Download
  9. D. Finkelshtein Y. Kondratiev O. Kutoviy. Individual based model with competition in spatial ecology, Preprint 2008. Download
  10. D. Finkelshtein and Yu. Kondratiev. Regulation mechanisms in spatial stochastic development models, 2008. Download
2009
  1. Maria João Oliveira, Habib Ouerdiane, José Luís Silva and Rui Vilela Mendes. The fractional Poisson measure in infinite dimensions, arXiv:1002.2124
  2. Maria João Oliveira, José Luís da Silva, Ludwig Streit. Intersection local times of independent fractional Brownian motions as generalized white noise functionals. Submitted to Acta Applicandae Mathematicae. arXiv:1001.0513, 2009
  3. J. L. Da Silva, M. Erraoui and H. Ouerdiane. Convolution Equation: Solution and Probabilistic Representation. Proceedings of the 29th Conference in Quantum Probability and Infinite Dimensional Analysis, 2008.
  4. Yuri G. Kondratiev, Tobias Kuna, Maria João Oliveira, José Luís da Silva, Ludwig Streit, Hydrodynamic limits for the free Kawasaki dynamics of continuous particle systems, Submitted to the journal of Functional Analysis, 2010. arXiv:0912.1312

2010
  1. Dmitri Finkelshtein, Yuri Kondratiev, Oleksandr Kutoviy. Vlasov scaling for the Glauber dynamics in continuum, arXiv:1002.4762
  2. M. Grothaus, L. Streit and A. Vogel. THE COMPLEX SCALED FEYNMAN-KAC FORMULA FOR SINGULAR INITIAL DISTRIBUTIONS To apperar in the proceedings of the Hammamet conference 2009, Stochastics An International Journal of Probability and Stochastic Processes, 2010. [pdf]
  3. M. J. Oliveira, J. L. Silva and L. Streit. Intersection local times of independent fractional Brownian motions as generalized white noise functionals. Acta Appl. Math. 2010 [review] [arxiv]
  4. M. J. Oliveira, H. Ouerdiane, J. L. Silva and R. Vilela Mendes. The fractional Poisson measure in infinite dimensions. Submitted to Stochastics: An International Journal of Probability and Stochastic Processes, 2010 [pdf]
  5. M. Grothaus, M. J. Oliveira, J. L. Silva and L. Streit. Self-avoiding fractional Brownian motion - The Edwards model 2010. [pdf]
  6. M. Erraoui and J. L. Silva. Stability of stochastic differential equations driven by variants of stable processes. Submitted to the proceedings of the “Modern Stochastics: Theory and Applications II” to be published in Communications in Statistics – Theory and Methods, 2011. arXiv:1009.5934