Publications

  1. F. Mori, S. N. Majumdar, G. Schehr, Time between the maximum and the minimum of a stochastic process, Phys. Rev. Lett. 123, 200201 (2019). PDF
  2. F. Mori, P. Le Doussal, S. N. Majumdar, and G. Schehr, Universal survival probability for a d-dimensional run-and-tumble particle, Phys. Rev. Lett. 124, 090603 (2020). PDF
  3. F. Mori, S. N. Majumdar, and G. Schehr, Distribution of the time between maximum and minimum of random walks, Phys. Rev. E 101, 052111 (2020). PDF
  4. B. Lacroix-A-Chez-Toine, and F. Mori, Universal survival probability for a correlated random walk and applications to records, J. Phys. A: Math. Theor. 53, 495002 (2020). PDF
  5. F. Mori, P. Le Doussal, S. N. Majumdar, and G. Schehr, Universal properties of a run-and-tumble particle in arbitrary dimension », Phys. Rev. E 102, 042133 (2020). PDF highlighted by the Editors of Physical Review E as an Editor’s suggestion
  6.  S. N. Majumdar, F. Mori, H. Schawe, G. Schehr, Mean perimeter and area of the convex hull of a planar Brownian motion in the presence of resetting, Phys. Rev. E 103, 022135 (2021). PDF
  7. F. Mori, P. L. Doussal, S. N. Majumdar, and G. Schehr, Condensation transition in the late-time position of a run-and-tumble particle, Phys. Rev. E 103, 062134 (2021). PDF
  8. F. Mori, S. N. Majumdar, and G. Schehr, Distribution of the time of the maximum for stationary processes, Europhys.Lett. 135, 30003 (2021). PDF highlighted by the Editors of Europhysics Letters as an Editor’s choice
  9. F. Mori, G. Gradenigo, and S. N. Majumdar, First-order condensation transition in the position distribution of a run-and-tumble particle in one dimension, J. Stat. Mech. 103208 (2021). PDF
  10. B. De Bruyne and F. Mori, Resetting in Stochastic Optimal Control, arXiv:2112.11416 (2021). (Accepted in Phys. Rev. Res.) PDF
  11. M. Biroli, F. Mori, and S. N. Majumdar, Number of distinct sites visited by a resetting random walker,  J. Phys. A: Math. Theor. https://doi.org/10.1088/1751-8121/ac6b69. PDF
  12. F. Mori, S. N. Majumdar, G. Schehr, Time to reach the maximum for a stationary stochastic process, Phys. Rev. E 106, o54110 (2022). PDF

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