Articles

  • A. Sylla: Convergence of a Finite Volume Scheme for Compactly Heterogeneous Scalar Conservation Laws (2024, HAL, arXiv)

  • R.M. Colombo, V. Perrollaz, A. Sylla: Initial Data Identification in Space Dependent Conservation Laws and Hamilton-Jacobi Equations, to appear in Communications in Partial Differential Equations, 2024 (HAL, arXiv)

  • R.M. Colombo, V. Perrollaz, A. Sylla: Conservation Laws and Hamilton-Jacobi Equations with Space Inhomogeneity in Journal of Evolution Equations 23(50) (2023, link)

  • B. Andreianov, A. Sylla: Finite Volume Approximation and Well-Posedness of Conservation Laws with Moving Interfaces under Abstract Coupling Conditions in Nonlinear Differential Equations and Applications 30(53) (2023, link)

  • A. Sylla: A LWR Model with Constraints at Moving Interfaces in ESAIM: Mathematical Modelling and Numerical Analysis 56(3):1081-1114 (2022, link)

  • B. Andreianov, A. Sylla: Existence Analysis and Numerical Approximation for a Second Order Model of Traffic with Orderliness Marker in Mathematical Models and Methods in Applied Sciences 32(7):1295-1348 (2022, link)

  • A. Sylla: Influence of a Slow Moving Vehicle on Traffic: Well-Posedness and Approximation for a Mildly Nonlocal Model in Networks & Heterogeneous Media 16(2):221-256 (2021, link)

Proceedings

  • R.M. Colombo, V. Perrollaz, A. Sylla: Peculiarities of Space Dependent Conservation Laws: Inverse Design and Asymptotics, to appear in XVIII International Conference on

    Hyperbolic Problems: Theory, Numerics, Applications (HYP2022, HAL, arXiv)

  • R.M. Colombo, V. Perrollaz, A. Sylla: Lāˆž Stationary Solutions to Non Homogeneous Conservation Laws, to appear in XVIII International Conference on Hyperbolic Problems:

    Theory, Numerics, Applications (HYP2022, preprint)

  • B. Boutin, J.-F. Coulombel, T.H.T. Nguyen, A. Sylla, S. Tran-Tien: High Order Numerical Schemes for Transport Equations on Bounded Domains in ESAIM: Proceedings and Surveys, Vol 70, p. 84-106 (2021, link)

  • B. Andreianov, A. Sylla: A Macroscopic Model to Reproduce Self-Organization near Exits in International Conference on Finite Volumes for Complex Applications. Springer, Cham, p. 243-254 (2020, preprint)

PhD Thesis (link)