On the accuracy of the rotation form in simulations of the Navier–Stokes equations W Layton, CC Manica, M Neda, M Olshanskii, LG Rebholz Journal of Computational Physics 228 (9), 3433-3447, 2009 | 129 | 2009 |
Numerical analysis and computational testing of a high accuracy Leray‐deconvolution model of turbulence W Layton, CC Manica, M Neda, LG Rebholz Numerical Methods for Partial Differential Equations: An International …, 2008 | 118 | 2008 |
Truncation of scales by time relaxation W Layton, M Neda Journal of Mathematical Analysis and Applications 325 (2), 788-807, 2007 | 97 | 2007 |
The stabilized extrapolated trapezoidal finite-element method for the Navier–Stokes equations A Labovsky, WJ Layton, CC Manica, M Neda, LG Rebholz Computer Methods in Applied Mechanics and Engineering 198 (9-12), 958-974, 2009 | 95 | 2009 |
Numerical analysis and computational comparisons of the NS-alpha and NS-omega regularizations W Layton, CC Manica, M Neda, LG Rebholz Computer Methods in Applied Mechanics and Engineering 199 (13-16), 916-931, 2010 | 80 | 2010 |
Enabling numerical accuracy of Navier-Stokes-α through deconvolution and enhanced stability CC Manica, M Neda, M Olshanskii, LG Rebholz ESAIM: Mathematical modelling and numerical analysis 45 (2), 277-307, 2011 | 48 | 2011 |
Numerical analysis of a higher order time relaxation model of fluids VJ Ervin, W Layton, M Neda Int. J. Numer. Anal. Model 4 (3), 648-670, 2007 | 46 | 2007 |
Time relaxation algorithm for flow ensembles A Takhirov, M Neda, J Waters Numerical Methods for Partial Differential Equations 32 (3), 757-777, 2016 | 42 | 2016 |
Numerical analysis of filter-based stabilization for evolution equations VJ Ervin, WJ Layton, M Neda SIAM Journal on Numerical Analysis 50 (5), 2307-2335, 2012 | 42 | 2012 |
Numerical analysis of modular regularization methods for the BDF2 time discretization of the Navier-Stokes equations∗ W Layton, N Mays, M Neda, C Trenchea ESAIM: Mathematical Modelling and Numerical Analysis 48 (3), 765-793, 2014 | 38 | 2014 |
A similarity theory of approximate deconvolution models of turbulence W Layton, M Neda Journal of mathematical analysis and applications 333 (1), 416-429, 2007 | 38 | 2007 |
The joint Helicity-Energy cascade for homogeneous, isotropic turbulence generated by approximate deconvolution models W Layton, C Manica, M Neda, L Rebholz Advances and Applications in Fluid Mechanics 4 (1), 1-46, 2008 | 28 | 2008 |
On an efficient finite element method for Navier-Stokes-ω with strong mass conservation CC Manica, M Neda, M Olshanskii, LG Rebholz, NE Wilson Computational Methods in Applied Mathematics 11 (1), 3-22, 2011 | 21 | 2011 |
A numerical study of the Navier–Stokes-αβ model TY Kim, M Neda, LG Rebholz, E Fried Computer methods in applied mechanics and engineering 200 (41-44), 2891-2902, 2011 | 18 | 2011 |
Discontinuous time relaxation method for the time-dependent Navier-Stokes equations M Neda Advances in Numerical Analysis 2010, 2010 | 18 | 2010 |
Helicity and energy conservation and dissipation in approximate deconvolution LES models of turbulence WJ Layton, CC Manica, M Neda, LG Rebholz Advances and Applications in Fluid Mechanics 4 (1), 1-46, 2008 | 15 | 2008 |
Sensitivity analysis of the grad-div stabilization parameter in finite element simulations of incompressible flow M Neda, F Pahlevani, LG Rebholz, J Waters Journal of Numerical Mathematics 24 (3), 189-206, 2016 | 14 | 2016 |
Numerical analysis of a nonlinear time relaxation model of fluids AA Dunca, M Neda Journal of Mathematical Analysis and Applications 420 (2), 1095-1115, 2014 | 13 | 2014 |
Numerical analysis and computations of a high accuracy time relaxation fluid flow model S De, D Hannasch, M Neda, E Nikonova International Journal of Computer Mathematics 89 (17), 2353-2373, 2012 | 13 | 2012 |
The energy cascade for homogeneous, isotropic turbulence generated by approximate deconvolution models W Layton, M Neda Technical report, 2006 | 13 | 2006 |