Probability and Stochastic Analysis - University of Bonn
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Published articles

  1. Examples of DLR states which are not weak limits of finite volume Gibbs measures with deterministic boundary conditions
    L. Coquille,
    Journal of Statistical Physics, 159 (2015), pp. 958-971.
    [DOI 10.1007/s10955-015-1211-3[Arxiv]

  2. On the Gibbs states of the noncritical Potts model on Z^2,
    L. Coquille, H. Duminil-Copin, D. Ioffe, and Y. Velenik,
    Probability Theory and Related Fields, 158 (2014), pp. 477–512.
    [DOI 10.1007/s00440-013-0486-z] [Arxiv] [Slides]

  3. A note on the discrete Gaussian free field with disordered pinning on Z^d, d ≥ 2,
    L. Coquille and P. Miłoś,
    Stochastic Processes and their Applications, 123 (2013), pp. 3542 – 3559.
    [DOI 10.1016/j.spa.2013.04.022
    ] [Arxiv]

  4. A finite-volume version of Aizenman–Higuchi theorem for the 2d Ising model,
    L. Coquille and Y. Velenik,
    Probability Theory and Related Fields, 153 (2012), pp. 25–44.
    [DOI: 10.1007/s00440-011-0339-6
    ] [Arxiv] [Poster] [Slides]

Preprints

  1. A stochastic individual-based model for immunotherapy of cancer,
    M. Baar, L. Coquille, H. Mayer, M. Hölzel, M. Rogava, T. Tüting, and A. Bovier, (2015).
    [ArXiv:1505.00452] [Poster]

  2. A second note on the Gaussian free field with disordered pinning on Z^d, d ≥ 2,
    L. Coquille and P. Miłoś, (2013)
    [ArXiv:1303.6770]

Articles in preparation

  1. Towards metastability in a model of population dynamics with competition,
    A. Bovier and L. Coquille,
    In preparation.
    [Slides]


  2. Trait substitution tree for the Mendelian diploid model
    A. Bovier, L. Coquille, and R. Neukirch, 
    In preparation.

 

PhD Thesis

  • Flowers, Forests and Fields in Physics
    University of Geneva, Switzerland. June 2013.
    Under the supervision of Prof. Yvan Velenik
    [Thesis] (in english), [Slides] (in french).