Probability distribution of the free energy of the continuum directed random polymer in 1+ 1 dimensions G Amir, I Corwin, J Quastel Communications on pure and applied mathematics 64 (4), 466-537, 2011 | 702 | 2011 |

The one-dimensional KPZ equation and its universality class J Quastel, H Spohn Journal of Statistical Physics 160, 965-984, 2015 | 252 | 2015 |

Diffusion of color in the simple exclusion process J Quastel Communications on pure and applied mathematics 45 (6), 623-679, 1992 | 248 | 1992 |

Introduction to KPZ J Quastel Current developments in mathematics 2011 (1), 2011 | 235 | 2011 |

The KPZ fixed point K Matetski, J Quastel, D Remenik Acta Mathematica 227 (1), 115-203, 2021 | 230 | 2021 |

The intermediate disorder regime for directed polymers in dimension T Alberts, K Khanin, J Quastel | 182 | 2014 |

Diffusion processes in composite porous media and their numerical integration by random walks: Generalized stochastic differential equations with discontinuous coefficients EM LaBolle, J Quastel, GE Fogg, J Gravner Water Resources Research 36 (3), 651-662, 2000 | 163 | 2000 |

A class of growth models rescaling to KPZ M Hairer, J Quastel Forum of Mathematics, Pi 6, e3, 2018 | 138 | 2018 |

The continuum directed random polymer T Alberts, K Khanin, J Quastel Journal of Statistical Physics 154 (1), 305-326, 2014 | 126 | 2014 |

Fluctuation exponent of the KPZ/stochastic Burgers equation M Balázs, J Quastel, T Seppäläinen Journal of the American Mathematical Society 24 (3), 683-708, 2011 | 122* | 2011 |

Effect of noise on front propagation in reaction-diffusion equations of KPP type C Mueller, L Mytnik, J Quastel Inventiones mathematicae 184 (2), 405-453, 2011 | 116 | 2011 |

Diffusion theory for transport in porous media: Transition‐probability densities of diffusion processes corresponding to advection‐dispersion equations EM LaBolle, J Quastel, GE Fogg Water Resources Research 34 (7), 1685-1693, 1998 | 116 | 1998 |

Renormalization fixed point of the KPZ universality class I Corwin, J Quastel, D Remenik Journal of Statistical Physics 160 (4), 815-834, 2015 | 108 | 2015 |

Large deviations for the symmetric simple exclusion process in dimensions *d*≥ 3J Quastel, F Rezakhanlou, SRS Varadhan Probability theory and related fields 113, 1-84, 1999 | 87 | 1999 |

Convergence of exclusion processes and the KPZ equation to the KPZ fixed point J Quastel, S Sarkar Journal of the American Mathematical Society 36 (1), 251-289, 2023 | 84 | 2023 |

KPZ equation, its renormalization and invariant measures T Funaki, J Quastel Stochastic Partial Differential Equations: Analysis and Computations 3 (2 …, 2015 | 81 | 2015 |

Airy processes and variational problems J Quastel, D Remenik Topics in percolative and disordered systems, 121-171, 2014 | 73 | 2014 |

Lattice gases, large deviations, and the incompressible Navier-Stokes equations J Quastel, HT Yau Annals of mathematics, 51-108, 1998 | 72 | 1998 |

Endpoint distribution of directed polymers in 1+ 1 dimensions G Moreno Flores, J Quastel, D Remenik Communications in Mathematical Physics 317, 363-380, 2013 | 68 | 2013 |

Intermediate Disorder Regime for Directed Polymers in Dimension T Alberts, K Khanin, J Quastel Physical review letters 105 (9), 090603, 2010 | 66* | 2010 |