Adam Larios, Ph.D.
Affiliations: | 2011 | Mathematics - Ph.D. | University of California, Irvine, Irvine, CA |
Area:
Mathematics, Applied MathematicsGoogle:
"Adam Larios"Parents
Sign in to add mentor| Edriss S. Titi | grad student | 2011 | UC Irvine | |
| (The Inviscid Voigt-Regularization for Hydrodynamic Models: Global Regularity, Boundary Conditions, and Blow-Up Phenomena.) | ||||
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Publications
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| Larios A, Pei Y. (2020) Approximate continuous data assimilation of the 2D Navier-Stokes equations via the Voigt-regularization with observable data Evolution Equations and Control Theory. 9: 0 |
| Carlson E, Hudson J, Larios A. (2020) Parameter Recovery for the 2 Dimensional Navier--Stokes Equations via Continuous Data Assimilation Siam Journal On Scientific Computing. 42 |
| Larios A, Yamazaki K. (2020) On the well-posedness of an anisotropically-reduced two-dimensional Kuramoto–Sivashinsky equation Physica D: Nonlinear Phenomena. 411: 132560 |
| Jafarzadeh S, Larios A, Bobaru F. (2020) Efficient Solutions for Nonlocal Diffusion Problems Via Boundary-Adapted Spectral Methods Journal of Peridynamics and Nonlocal Modeling. 2: 85-110 |
| Larios A, Pei Y, Rebholz L. (2019) Global well-posedness of the velocity–vorticity-Voigt model of the 3D Navier–Stokes equations Journal of Differential Equations. 266: 2435-2465 |
| Larios A, Rebholz LG, Zerfas C. (2019) Global in time stability and accuracy of IMEX-FEM data assimilation schemes for Navier–Stokes equations Computer Methods in Applied Mechanics and Engineering. 345: 1077-1093 |
| Biswas A, Hudson J, Larios A, et al. (2018) Continuous data assimilation for the 2D magnetohydrodynamic equations using one component of the velocity and magnetic fields Asymptotic Analysis. 108: 1-43 |
| Larios A, Petersen MR, Titi ES, et al. (2018) A computational investigation of the finite-time blow-up of the 3D incompressible Euler equations based on the Voigt regularization Theoretical and Computational Fluid Dynamics. 32: 23-34 |
| Larios A, Pei Y. (2017) On the local well-posedness and a Prodi–Serrin-type regularity criterion of the three-dimensional MHD-Boussinesq system without thermal diffusion Journal of Differential Equations. 263: 1419-1450 |
| Biswas A, Foias C, Larios A. (2017) On the attractor for the semi-dissipative Boussinesq equations Annales De L Institut Henri Poincare-Analyse Non Lineaire. 34: 381-405 |