Tsogtgerel Gantumur
Tsogtgerel Gantumur
McGill University (Mathematics), National University of Mongolia (Physics)
Verified email at - Homepage
Cited by
Cited by
An optimal adaptive wavelet method without coarsening of the iterands
T Gantumur, H Harbrecht, R Stevenson
Mathematics of computation 76 (258), 615-629, 2007
Rough solutions of the Einstein constraints on closed manifolds without near-CMC conditions
M Holst, G Nagy, G Tsogtgerel
Communications in Mathematical Physics 288 (2), 547-613, 2009
Adaptive boundary element methods with convergence rates
T Gantumur
Numerische Mathematik 124, 471-516, 2013
Analysis of a general family of regularized Navier–Stokes and MHD models
M Holst, E Lunasin, G Tsogtgerel
Journal of Nonlinear Science 20 (5), 523-567, 2010
Far-from-Constant Mean Curvature Solutions of Einstein’s Constraint Equations<? format?> with Positive Yamabe Metrics
M Holst, G Nagy, G Tsogtgerel
Physical Review Letters 100 (16), 161101, 2008
Computation of differential operators in wavelet coordinates
T Gantumur, R Stevenson
Mathematics of computation 75 (254), 697-709, 2006
Computation of singular integral operators in wavelet coordinates
T Gantumur, RP Stevenson
Computing 76, 77-107, 2006
The Lichnerowicz equation on compact manifolds with boundary
M Holst, G Tsogtgerel
Classical and Quantum Gravity 30 (20), 205011, 2013
An optimal adaptive wavelet method for nonsymmetric and indefinite elliptic problems
T Gantumur
Journal of computational and applied mathematics 211 (1), 90-102, 2008
Convergence of discrete exterior calculus approximations for Poisson problems
E Schulz, G Tsogtgerel
Discrete & Computational Geometry 63, 346-376, 2020
Local convergence of adaptive methods for nonlinear partial differential equations
M Holst, G Tsogtgerel, Y Zhu
arXiv preprint arXiv:1001.1382, 2010
Non-CMC solutions of the Einstein constraint equations on compact manifolds with apparent horizon boundaries
M Holst, C Meier, G Tsogtgerel
Communications in Mathematical Physics 357, 467-517, 2018
Adaptivity of a B-spline based finite-element method for modeling wind-driven ocean circulation
I Al Balushi, W Jiang, G Tsogtgerel, TY Kim
Computer Methods in Applied Mechanics and Engineering 332, 1-24, 2018
On the convergence theory of adaptive mixed finite element methods for the stokes problem
T Gantumur
arXiv preprint arXiv:1403.0895, 2014
On the consistency of the combinatorial codifferential
D Arnold, R Falk, J Guzmán, G Tsogtgerel
Transactions of the American Mathematical Society 366 (10), 5487-5502, 2014
Convergence rates of adaptive methods, Besov spaces, and multilevel approximation
T Gantumur
Foundations of Computational Mathematics 17 (4), 917-956, 2017
Analytical study of generalized α-models of turbulence
M Holst, E Lunasin, G Tsotgtgerel
Journal of Nonlinear Science 20 (5), 523-567, 2010
Polyharmonic splines interpolation on scattered data in 2D and 3D with applications
K Rubasinghe, G Yao, J Niu, G Tsogtgerel
Engineering Analysis with Boundary Elements 156, 240-250, 2023
Adaptive wavelet algorithms for solving operator equations
T Gantumur
Utrecht University, 2006
Solving nonlinear elliptic PDEs in 2D and 3D using polyharmonic splines and low-degree of polynomials
K Rubasinghe, G Yao, W Li, G Tsogtgerel
International Journal of Computational Methods 20 (08), 2250051, 2023
The system can't perform the operation now. Try again later.
Articles 1–20