Stephane Bordas, Ph.D.
Affiliations: | 2003 | Northwestern University, Evanston, IL |
Area:
Applied Mechanics, Mechanical Engineering, Civil EngineeringGoogle:
"Stephane Bordas"Parents
Sign in to add mentor| Brian Moran | grad student | 2003 | Northwestern | |
| (Extended finite element and level set methods with applications to growth of cracks and biofilms.) | ||||
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Publications
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| Cascio M, Baroli D, Bordas S, et al. (2019) Coupled molecular-dynamics and finite-element-method simulations for the kinetics of particles subjected to field-mediated forces. Physical Review. E. 99: 063307 |
| Bansal M, Singh IV, Mishra BK, et al. (2019) A parallel and efficient multi-split XFEM for 3-D analysis of heterogeneous materials Computer Methods in Applied Mechanics and Engineering. 347: 365-401 |
| Wu JY, Nguyen VP, Nguyen CT, et al. (2019) Phase-field modeling of fracture Advances in Applied Mechanics |
| Agathos K, Chatzi E, Bordas SPA. (2018) Multiple crack detection in 3D using a stable XFEM and global optimization. Computational Mechanics. 62: 835-852 |
| Akbari A, Kerfriden P, Bordas S. (2018) On the effect of grains interface parameters on the macroscopic properties of polycrystalline materials Computers & Structures. 196: 355-368 |
| Ortiz-Bernardin A, Köbrich P, Hale J, et al. (2018) A volume-averaged nodal projection method for the Reissner–Mindlin plate model Computer Methods in Applied Mechanics and Engineering. 341: 827-850 |
| Hauseux P, Hale JS, Bordas SPA. (2017) Calculating the Malliavin derivative of some stochastic mechanics problems. Plos One. 12: e0189994 |
| Hirshikesh, Natarajan S, Annabattula RK, et al. (2017) Erratum to: Trefftz polygonal finite element for linear elasticity: convergence, accuracy, and properties Asia Pacific Journal On Computational Engineering. 4: 4 |
| Hirshikesh, Natarajan S, Annabattula RK, et al. (2017) Trefftz polygonal finite element for linear elasticity: convergence, accuracy, and properties Asia Pacific Journal On Computational Engineering. 4: 3 |
| Bourantas G, Loukopoulos VC, Chowdhury HA, et al. (2017) An implicit potential method along with a meshless technique for incompressible fluid flows for regular and irregular geometries in 2D and 3D Engineering Analysis With Boundary Elements. 77: 97-111 |