Articles with public access mandates - Christopher HendersonLearn more
Available somewhere: 27
Smoothing for Weak Solutions of the Inhomogeneous Landau Equation
C Henderson, S Snelson
Archive for Rational Mechanics and Analysis 236 (1), 113-143, 2020
Mandates: US National Science Foundation
Thin front limit of an integro-differential Fisher-KPP equation with fat-tailed kernels
E Bouin, J Garnier, C Henderson, F Patout
SIAM Journal on Mathematical Analysis 50 (3), 3365-3394, 2018
Mandates: US National Science Foundation, European Commission
Super-linear spreading in local and non-local cane toads equations
E Bouin, C Henderson, L Ryzhik
Journal de mathématiques Pures et Appliquées, 2017
Mandates: US National Science Foundation
Local existence, lower mass bounds, and a new continuation criterion for the Landau equation
C Henderson, S Snelson, A Tarfulea
Journal of Differential Equations 266 (2-3), 1536-1577, 2019
Mandates: US National Science Foundation
Ricci curvature bounds for weakly interacting Markov chains
M Erbar, C Henderson, G Menz, P Tetali
Mandates: US National Science Foundation, German Research Foundation
The Bramson delay in the non-local Fisher-KPP equation
E Bouin, C Henderson, L Ryzhik
Annales de l'Institut Henri Poincaré C 37 (1), 51-77, 2020
Mandates: US National Science Foundation, European Commission, Agence Nationale de la …
The Bramson logarithmic delay in the cane toads equations
E Bouin, C Henderson, L Ryzhik
Quarterly of Applied Mathematics 75 (4), 599-634, 2017
Mandates: US National Science Foundation, European Commission
Propagation in a Fisher-KPP equation with non-local advection
F Hamel, C Henderson
Journal of Functional Analysis 278 (7), 108426, 2020
Mandates: US National Science Foundation, European Commission, Agence Nationale de la …
Non-local competition slows down front acceleration during dispersal evolution
V Calvez, C Henderson, S Mirrahimi, O Turanova, T Dumont
Annales Henri Lebesgue 5, 1-71, 2022
Mandates: US National Science Foundation, European Commission, Agence Nationale de la …
Local solutions of the Landau equation with rough, slowly decaying initial data
C Henderson, S Snelson, A Tarfulea
Annales de l'Institut Henri Poincaré C, Analyse non linéaire 37 (6), 1345-1377, 2020
Mandates: US National Science Foundation
Self-generating lower bounds and continuation for the Boltzmann equation
C Henderson, S Snelson, A Tarfulea
Calculus of Variations and Partial Differential Equations 59 (6), 191, 2020
Mandates: US National Science Foundation
Pushed, pulled and pushmi-pullyu fronts of the Burgers-FKPP equation
J An, C Henderson, L Ryzhik
arXiv preprint arXiv:2108.07861, 2021
Mandates: US National Science Foundation, US Department of Defense
Influence of a mortality trade-off on the spreading rate of cane toads fronts
E Bouin, MH Chan, C Henderson, PS Kim
arXiv preprint arXiv:1702.00179, 2017
Mandates: US National Science Foundation, Australian Research Council, European Commission
Slow and fast minimal speed traveling waves of the FKPP equation with chemotaxis
C Henderson
Journal de Mathématiques Pures et Appliquées 167, 175-203, 2022
Mandates: US National Science Foundation
Quantitative steepness, semi-FKPP reactions, and pushmi-pullyu fronts
J An, C Henderson, L Ryzhik
Archive for Rational Mechanics and Analysis 247 (5), 88, 2023
Mandates: Agence Nationale de la Recherche
Super-linear spreading in local bistable cane toads equations
E Bouin, C Henderson
Nonlinearity 30 (4), 1356, 2017
Mandates: European Commission
The speed of traveling waves in a FKPP-Burgers system
JJ Bramburger, C Henderson
Archive for Rational Mechanics and Analysis 241 (2), 643-681, 2021
Mandates: US National Science Foundation
Super-linear propagation for a general, local cane toads model
C Henderson, B Perthame, PE Souganidis
Interfaces and Free Boundaries 20 (4), 483-509, 2018
Mandates: US National Science Foundation
Local well-posedness for the Boltzmann equation with very soft potential and polynomially decaying initial data
C Henderson, W Wang
SIAM Journal on Mathematical Analysis 54 (3), 2845-2875, 2022
Mandates: US National Science Foundation
The Bramson delay in a Fisher–KPP equation with log-singular nonlinearity
E Bouin, C Henderson
Nonlinear Analysis 213, 112508, 2021
Mandates: US National Science Foundation
Publication and funding information is determined automatically by a computer program