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Publications

Preprints: ??

  1. A fast point charge interacting with the screened Vlasov-Poisson system. Richard M. H?fer, Raphael Winter.To appear in Arch. Rational Mech. Anal. (2024). arxiv:2205.00035
  2. Sedimentation of particles with very small inertia I: Convergence to the transport-Stokes equation. Richard M. H?fer, Richard Schubert. To appear in Duke Math. J. (2024) arXiv:2302.04637(2023)
  3. Richard M. H?fer, Amina Mecherbet, Richard Schubert. Non-existence of mean-field models for particle orientations in suspensions. arxiv:221015382 (2022)
  4. Homogenization of the Navier-Stokes equations in perforated domains in the invicid limit. Richard. M. H?fer. arxiv:2209.06075 (2022)
  5. Fluctuations in the homogenization of the Poisson and Stokes equations in perforated domains. Richard M. H?fer, Jonas Jansen. To appear in Arch. Rational Mech. Anal. (2024). arXiv:2004.04111 (2020)

Published:

  1. Non-existence of mean-field models for particle orientations in suspensions. Richard M. H?fer, Amina Mecherbet, Richard Schubert, Journal of Nonlinear Science Vol. 34, Art. No. 3 (2024)
  2. Hindered settling of well-separated particle suspensions
    Matthieu Hillairet, Richard M. H?fer. Pure and Applied Analysis, Vol. 6, p.p. 581-609 (2024)
  3. Derivation of the viscoelastic stress in? Stokes flows induced by non-spherical Brownian rigid particles through homogenization. Richard M. H?fer, Marta Leocata, Amina Mecherbet, Pure and Applied Analysis Vol 5, pp. 409-460 (2023)
  4. Homogenization of the Navier-Stokes equations in perforated domains in the invicid limit. Richard. M. H?fer, Nonlinearity Vol. 36, 6019 (2023)
  5. Convergence of the pressure in the homogenization of the Stokes equations in randomly perforated domains. Arianna Giunti, Richard M. H?fer. J. Diff. Equ., Vol. 320, pp. 399-418 (2022)
  6. Motion of several slender rigid filaments in a Stokes flow. Richard M. H?fer, Christophe Prange, Franck Sueur. J. ?c. polytech., Vol. 9, pp. 327-380 (2022)
  7. Convergence of the method of reflections for particle suspensions in Stokes flows. Richard M. H?fer. J. Differ. Equ., Vol. 297, pp. 81-109 (2021)
  8. Darcy's law as low Mach and homogenization limit of a compressible fluid in perforated domains. Richard M. H?fer, Karina Kowalzcyk, Sebastian Schwarzacher. Math. Models Methods Appl. Sci., Vol. 31, pp. 1787-1819? (2021)
  9. The influence of Einstein's effective viscosity on sedimentation at very small particle volum