Jonathan C. Mattingly
Jonathan C. Mattingly
Professor of Mathematics and Statistical Science, Duke University
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Cited by
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Ergodicity for SDEs and approximations: locally Lipschitz vector fields and degenerate noise
JC Mattingly, AM Stuart, DJ Higham
Stochastic processes and their applications 101 (2), 185-232, 2002
Ergodicity of the 2D Navier-Stokes equations with degenerate stochastic forcing
M Hairer, JC Mattingly
Annals of Mathematics, 993-1032, 2006
Yet another look at Harris’ ergodic theorem for Markov chains
M Hairer, JC Mattingly
Seminar on Stochastic Analysis, Random Fields and Applications VI: Centro†…, 2011
Asymptotic coupling and a general form of Harris’ theorem with applications to stochastic delay equations
M Hairer, JC Mattingly, M Scheutzow
Probability theory and related fields 149, 223-259, 2011
Low-dimensional models of coherent structures in turbulence
PJ Holmes, JL Lumley, G Berkooz, JC Mattingly, RW Wittenberg
Physics Reports 287 (4), 337-384, 1997
Spectral gaps in Wasserstein distances and the 2D stochastic Navier–Stokes equations
M Hairer, JC Mattingly
Exponential convergence for the stochastically forced Navier-Stokes equations and other partially dissipative dynamics
JC Mattingly
Communications in mathematical physics 230, 421-462, 2002
Convergence of numerical time-averaging and stationary measures via Poisson equations
JC Mattingly, AM Stuart, MV Tretyakov
SIAM Journal on Numerical Analysis 48 (2), 552-577, 2010
Gibbsian Dynamics and Ergodicity for the Stochastically Forced Navier–Stokes Equation
E Weinan, JC Mattingly, Y Sinai
Communications in Mathematical Physics 224 (1), 83-106, 2001
A theory of hypoellipticity and unique ergodicity for semilinear stochastic PDEs
M Hairer, J Mattingly
Ergodicity of 2D Navier–Stokes Equations with Random Forcing and Large Viscosity
JC Mattingly
Communications in mathematical physics 206, 273-288, 1999
Diffusion limits of the random walk Metropolis algorithm in high dimensions
JC Mattingly, NS Pillai, AM Stuart
An elementary proof of the existence and uniqueness theorem for the Navier–Stokes equations
JC Mattingly, YG Sinai
Communications in Contemporary Mathematics 1 (04), 497-516, 1999
The strong Feller property for singular stochastic PDEs
M Hairer, J Mattingly
An adaptive Euler-Maruyama scheme for SDEs: convergence and stability
H Lamba, JC Mattingly, AM Stuart
IMA Journal of Numerical Analysis 27 (3), 479–506, 2007
Malliavin calculus for the stochastic 2D Navier—Stokes equation
JC Mattingly, … Pardoux
Communications on Pure and Applied Mathematics: A Journal Issued by the†…, 2006
Long-range allosteric interactions between the folate and methionine cycles stabilize DNA methylation reaction rate
HF Nijhout, MC Reed, DF Anderson, JC Mattingly, SJ James, CM Ulrich
Epigenetics 1 (2), 81-87, 2006
Quantifying gerrymandering in north carolina
G Herschlag, HS Kang, J Luo, CV Graves, S Bangia, R Ravier, ...
Statistics and Public Policy 7 (1), 30-38, 2020
Sticky central limit theorems on open books
T Hotz, S Skwerer, S Huckemann, H Le, JS Marron, JC Mattingly, E Miller, ...
Geometric ergodicity of some hypo-elliptic diffusions for particle motions
JC Mattingly, AM Stuart
Markov Process. Related Fields 8 (2), 199-214, 2002
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