| 2022Anton Bovier and Lisa B. Hartung
The speed of invasion in an advancing population
2022
https://arxiv.org/abs/2204.11072
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| Anton Bovier and Adrien Schertzer
Fluctuations of the free energy in p-spin SK models on two scales
2022
https://arxiv.org/abs/2205.15080
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| 2021Oliver Assenmacher, Gabriele Bruell and Christina Lienstromberg
Non-Newtonian two-phase thin-film problem: Local existence, uniqueness, and stability
arXiv e-prints: arXiv:2101.12243 2021
https://ui.adsabs.harvard.edu/abs/2021arXiv210112243A
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| Yanjia Bai and Lisa B. Hartung
Refined Large Deviation Principle for Branching Brownian Motion Having a Low Maximum
2021
https://arxiv.org/abs/2102.09513
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| Anton Bovier and Lisa B. Hartung
Branching Brownian motion with self repulsion
2021
http://arxiv.org/abs/2102.07128
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| 2020Kaveh Bashiri
On the basin of attraction of McKean-Vlasov paths
2020
https://arxiv.org/pdf/2001.09106.pdf
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| D. Betea, P.L. Ferrari and A. Occelli
The half-space Airy stat process
preprint: arXiv:2012.10337 2020
https://arxiv.org/abs/2012.10337
Abstract: We study the multipoint distribution of stationary half-space last passage percolation with exponentially weighted times. We derive both finite-size and asymptotic results for this distribution. In the latter case we observe a new one-parameter process we call half-space Airy stat. It is a one-parameter generalization of the Airy stat process of Baik-Ferrari-Péché, which is recovered far away from the diagonal. All these results extend the one-point results previously proven by the authors. |
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| A. Bufetov and P. Nejjar
Shock fluctuations in TASEP under a variety of time scalings
arXiv:2003.12414 2020
https://arxiv.org/abs/2003.12414
Abstract: We consider the totally asymmetric simple exclusion process (TASEP) with two different initial conditions with shock discontinuities, made by block of fully packed particles. Initially a second class particle is at the left of a shock discontinuity. Using multicolored TASEP we derive an exact formulas for the distribution of the second class particle and colored height functions. These are given in terms of the height function at different positions of a single TASEP configuration. We study the limiting distributions of second class particles (and colored height functions). The result depends on how the width blocks of particles scale with the observation time; we study a variety of such scalings. |
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| Ofer Busani and Patrik L. Ferrari
Universality of the geodesic tree in last passage percolation
preprint, arXiv:2008.07844 2020
https://arxiv.org/abs/2008.07844
Abstract: In this paper we consider the geodesic tree in exponential last passage percolation. We show that for a large class of initial conditions around the origin, the line-to-point geodesic that terminates in a cylinder of width $o(N^{2/3})$ and length $o(N)$ agrees in the cylinder, with the stationary geodesic sharing the same end point. In the case of the point-to-point model, we consider width $\delta N^{2/3}$ and length up to $\delta^{3/2} N/(\log(\delta^{-1}))^3$ and provide lower and upper bound for the probability that the geodesics agree in that cylinder. |
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| 2019D. Betea, P.L. Ferrari and A. Occelli
Stationary half-space last passage percolation
preprint: arXiv:1905.08582 2019
https://arxiv.org/abs/1905.08582
Abstract: In this paper we study stationary last passage percolation (LPP) in half-space geometry. We determine the limiting distribution of the last passage time in a critical window close to the origin. The result is a two-parameter family of distributions: one parameter for the strength of the diagonal bounding the half-space (strength of the source at the origin in the equivalent TASEP language) and the other for the distance of the point of observation from the origin. It should be compared with the one-parameter family giving the BaikâRains distributions for full-space geometry. The result is obtained by using a related integrable model, having Pfaffian structure, together with careful analytic continuation and steepest descent analysis. |
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| Bastian Bohn, Michael Griebel and Jens Oettershagen
Optimally rotated coordinate systems for adaptive least-squares regression on sparse grids
2019
https://ins.uni-bonn.de/media/public/publication-media/INSPreprint_RotRegr.pdf
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| Anton Bovier, Saeda Marello, P. L. Ferrari and Elena Pulvirenti
Metastability for the dilute Curie-Weiss model with Glauber dynamics
2019
https://arxiv.org/abs/1912.10699
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| Alexander Effland, Erich Kobler, Anne Brandenburg, Teresa Klatzer, Leonie Neuhäuser, Michael Hölzel, Jennifer Landsberg, Thomas Pock and Martin Rumpf
Joint reconstruction and classification of tumor cells and cell interactions in melanoma tissue sections with synthesized training data
International Journal of Computer Assisted Radiology and Surgery, 14(4): 587--599 2019
https://dx.doi.org/10.1007/s11548-019-01919-z
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| 2018N. Barashkov and M. Gubinelli
Variational approach to Euclidean QFT
ArXiv e-prints 2018
https://arxiv.org/abs/1805.10814
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| Kaveh Bashiri and Anton Bovier
Gradient flow approach to local mean-field spin systems
2018
https://arxiv.org/abs/1806.07121
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| B. Bohn
On the convergence rate of sparse grid least squares regression
In J. Garcke and D. Pflüger and C. Webster and G. Zhang, editor, Sparse Grids and Applications - Miami 2016, Volume 123 of Lecture Notes in Computational Science and Engineering
page 19--41.
Publisher: Springer
2018
http://wissrech.ins.uni-bonn.de/research/pub/bohn/INSPreprint_SGLeastSquares.pdf
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| M. Bonacini, B. Niethammer and JJL Velázquez
Self-similar gelling solutions for the coagulation equation with diagonal kernel
2018
https://arxiv.org/abs/1711.02966
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| M. Bonacini, B. Niethammer and JJL Velázquez
Self-similar solutions to coagulation equations with time-dependent tails: the case of homogeneity
2018
https://arxiv.org/abs/1612.06610
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| Anton Bovier, Loren Coquille and Charline Smadi
Crossing a fitness valley as a metastable transition in a stochastic population model
2018
https://arxiv.org/abs/1801.06473
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| Anton Bovier, Dmitry Ioffe and Patrick Müller
The hydrodynamics limit for local mean-field dynamics with unbounded spins
2018
https://arxiv.org/abs/1805.00641
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