A high-order finite volume method for systems of conservation laws—Multi-dimensional Optimal Order Detection (MOOD) S Clain, S Diot, R Loubère Journal of computational Physics 230 (10), 4028-4050, 2011 | 381 | 2011 |
A Posteriori Subcell Limitation of the Discontinuous Galerkin Finite Element Method for Hyperbolic Conservation Laws M Dumbser, O Zanotti, R Loubere, S Diot arXiv preprint arXiv:1406.7416, 2014 | 366 | 2014 |
Improved detection criteria for the multi-dimensional optimal order detection (MOOD) on unstructured meshes with very high-order polynomials S Diot, S Clain, R Loubère Computers & Fluids 64, 43-63, 2012 | 211 | 2012 |
The Multidimensional Optimal Order Detection method in the three‐dimensional case: very high‐order finite volume method for hyperbolic systems S Diot, R Loubère, S Clain International Journal for Numerical Methods in Fluids 73 (4), 362-392, 2013 | 150 | 2013 |
A new family of high order unstructured MOOD and ADER finite volume schemes for multidimensional systems of hyperbolic conservation laws R Loubere, M Dumbser, S Diot Communications in Computational Physics 16 (3), 718-763, 2014 | 124 | 2014 |
An interface reconstruction method based on an analytical formula for 3D arbitrary convex cells S Diot, MM François Journal of Computational Physics 305, 63-74, 2016 | 40 | 2016 |
An interface reconstruction method based on analytical formulae for 2D planar and axisymmetric arbitrary convex cells S Diot, MM François, ED Dendy Journal of Computational Physics 275, 53-64, 2014 | 34 | 2014 |
Multi-dimensional optimal order detection (mood)—a very high-order finite volume scheme for conservation laws on unstructured meshes S Clain, S Diot, R Loubère Finite Volumes for Complex Applications VI Problems & Perspectives: FVCA 6 …, 2011 | 16 | 2011 |
A posteriori subcell limiting for discontinuous galerkin finite element method for hyperbolic system of conservation laws O Zanotti, M Dumbser, R Loubere, S Diot J. Comput. Phys 278, 47-75, 2014 | 11 | 2014 |
La méthode MOOD Multi-dimensional Optimal Order Detection: la première approche a posteriori aux méthodes volumes finis d'ordre très élevé S Diot Université de Toulouse, Université Toulouse III-Paul Sabatier, 2012 | 10 | 2012 |
A higher‐order unsplit 2D direct Eulerian finite volume method for two‐material compressible flows based on the MOOD paradigms S Diot, MM François, ED Dendy International Journal for Numerical Methods in Fluids 76 (12), 1064-1087, 2014 | 7 | 2014 |
A very high-order finite volume method for the one dimensional convection diffusion problem S Clain, G Machado, RMS Pereira | 6 | 2011 |
An overview on the multidimensional optimal order detection method S Clain, JM Figueiredo, R Loubere, S Diot Associação Portuguesa de Mecânica Teórica, Aplicada e Computacional (APMTAC), 2015 | 1 | 2015 |
Three-dimensional preliminary results of the MOOD method: A Very High-Order Finite Volume method for Conservation Laws. S Diot, S Clain, R Loubère | 1 | 2012 |
Adaptive Reconnection-based Arbitrary Lagrangian Eulerian Method MJ Shashkov, W Bo Los Alamos National Laboratory (LANL), Los Alamos, NM (United States), 2016 | | 2016 |
6th-order finite volume approximation for the steady-state burger and euler equations: the mood approach GJ Machado, S Clain, R Loubere, S Diot Associação Portuguesa de Mecânica Teórica, Aplicada e Computacional (APMTAC), 2015 | | 2015 |
A Multi-Material Triple Point Problem. xRage Computations. S Diot, MM François Los Alamos National Lab.(LANL), Los Alamos, NM (United States), 2013 | | 2013 |
Very high-order finite volume method for one-dimensional convection diffusion problems C Stéphane, S Diot, R Loubère, GJ Machado, R Ralha, R Pereira World Scientific and Engineering Academy and Society (WSEAS), 2011 | | 2011 |
2D HIGH-ORDER REMAPPING USING MOOD PARADIGMS R Loubere, M Kucharık, S Diot | | |