First-order system least squares on curved boundaries: Higher-order Raviart--Thomas elements F Bertrand, S Munzenmaier, G Starke SIAM Journal on Numerical Analysis 52 (6), 3165-3180, 2014 | 44 | 2014 |
First-order system least squares on curved boundaries: Lowest-order Raviart--Thomas elements F Bertrand, S Munzenmaier, G Starke SIAM Journal on Numerical Analysis 52 (2), 880-894, 2014 | 33 | 2014 |
First order least-squares formulations for eigenvalue problems F Bertrand, D Boffi IMA Journal of Numerical Analysis 42 (2), 1339-1363, 2022 | 29 | 2022 |
Parametric Raviart--Thomas elements for mixed methods on domains with curved surfaces F Bertrand, G Starke SIAM Journal on Numerical Analysis 54 (6), 3648-3667, 2016 | 25 | 2016 |
Least-squares formulations for eigenvalue problems associated with linear elasticity F Bertrand, D Boffi Computers & Mathematics with Applications 95, 19-27, 2021 | 17 | 2021 |
A posteriori error estimation for planar linear elasticity by stress reconstruction F Bertrand, M Moldenhauer, G Starke Computational Methods in Applied Mathematics 19 (3), 663-679, 2019 | 17 | 2019 |
Least-squares methods for elasticity and Stokes equations with weakly imposed symmetry F Bertrand, Z Cai, EY Park Computational Methods in Applied Mathematics 19 (3), 415-430, 2019 | 15 | 2019 |
The Prager–Synge theorem in reconstruction based a posteriori error estimation FBD Boffi 75 Years of Mathematics of Computation: Symposium on Celebrating 75 Years of …, 2020 | 14 | 2020 |
On robust discretization methods for poroelastic problems: Numerical examples and counter-examples F Bertrand, M Brodbeck, T Ricken Examples and Counterexamples 2, 100087, 2022 | 13 | 2022 |
Recent advances in least-squares and discontinuous Petrov–Galerkin finite element methods F Bertrand, L Demkowicz, J Gopalakrishnan, N Heuer Computational Methods in Applied Mathematics 19 (3), 395-397, 2019 | 13 | 2019 |
Weakly symmetric stress equilibration and a posteriori error estimation for linear elasticity F Bertrand, B Kober, M Moldenhauer, G Starke Numerical Methods for Partial Differential Equations 37 (4), 2783-2802, 2021 | 12 | 2021 |
Least-squares finite element method for a meso-scale model of the spread of COVID-19 F Bertrand, E Pirch Computation 9 (2), 18, 2021 | 12 | 2021 |
An adaptive finite element scheme for the Hellinger–Reissner elasticity mixed eigenvalue problem F Bertrand, D Boffi, R Ma Computational Methods in Applied Mathematics 21 (3), 501-512, 2021 | 11 | 2021 |
Stabilization-free HHO a posteriori error control F Bertrand, C Carstensen, B Gräßle, NT Tran Numerische Mathematik 154 (3-4), 369-408, 2023 | 10 | 2023 |
On the spectrum of an operator associated with least-squares finite elements for linear elasticity L Alzaben, F Bertrand, D Boffi Computational Methods in Applied Mathematics 22 (3), 511-528, 2022 | 10 | 2022 |
A posteriori error estimates by weakly symmetric stress reconstruction for the Biot problem F Bertrand, G Starke Computers & Mathematics with Applications 91, 3-16, 2021 | 10 | 2021 |
Asymptotically exact a posteriori error analysis for the mixed Laplace eigenvalue problem F Bertrand, D Boffi, R Stenberg Computational Methods in Applied Mathematics 20 (2), 215-225, 2020 | 10 | 2020 |
A reduced order model for the finite element approximation of eigenvalue problems F Bertrand, D Boffi, A Halim Computer Methods in Applied Mechanics and Engineering 404, 115696, 2023 | 9 | 2023 |
First-order system least-squares for interface problems F Bertrand SIAM Journal on Numerical Analysis 56 (3), 1711-1730, 2018 | 9 | 2018 |
Convergence analysis of the scaled boundary finite element method for the Laplace equation F Bertrand, D Boffi, G G. de Diego Advances in Computational Mathematics 47, 1-17, 2021 | 8 | 2021 |