Stochastic Homogenization of Monotone Systems of Viscous Hamilton--Jacobi Equations with Convex Nonlinearities
We consider the homogenization of monotone systems of viscous Hamilton--Jacobi equations with convex nonlinearities set in the stationary, ergodic setting. The primary focus of this paper is on collapsing systems which, as the microscopic scale tends to zero, average to a deterministic scalar Hamilt...
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| Format: | Journal article |
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Society for Industrial and Applied Mathematics
2013
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| _version_ | 1797079519782240256 |
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| author | Fehrman, B |
| author_facet | Fehrman, B |
| author_sort | Fehrman, B |
| collection | OXFORD |
| description | We consider the homogenization of monotone systems of viscous Hamilton--Jacobi equations with convex nonlinearities set in the stationary, ergodic setting. The primary focus of this paper is on collapsing systems which, as the microscopic scale tends to zero, average to a deterministic scalar Hamilton--Jacobi equation. However, our methods also apply to systems which do not collapse and, as the microscopic scale tends to zero, average to a deterministic system of Hamilton--Jacobi equations. |
| first_indexed | 2024-03-07T00:47:04Z |
| format | Journal article |
| id | oxford-uuid:850e9539-658a-4df7-88e9-1c6c05a7b887 |
| institution | University of Oxford |
| last_indexed | 2024-03-07T00:47:04Z |
| publishDate | 2013 |
| publisher | Society for Industrial and Applied Mathematics |
| record_format | dspace |
| spelling | oxford-uuid:850e9539-658a-4df7-88e9-1c6c05a7b8872022-03-26T21:54:54ZStochastic Homogenization of Monotone Systems of Viscous Hamilton--Jacobi Equations with Convex NonlinearitiesJournal articlehttp://purl.org/coar/resource_type/c_dcae04bcuuid:850e9539-658a-4df7-88e9-1c6c05a7b887Symplectic Elements at OxfordSociety for Industrial and Applied Mathematics2013Fehrman, BWe consider the homogenization of monotone systems of viscous Hamilton--Jacobi equations with convex nonlinearities set in the stationary, ergodic setting. The primary focus of this paper is on collapsing systems which, as the microscopic scale tends to zero, average to a deterministic scalar Hamilton--Jacobi equation. However, our methods also apply to systems which do not collapse and, as the microscopic scale tends to zero, average to a deterministic system of Hamilton--Jacobi equations. |
| spellingShingle | Fehrman, B Stochastic Homogenization of Monotone Systems of Viscous Hamilton--Jacobi Equations with Convex Nonlinearities |
| title | Stochastic Homogenization of Monotone Systems of Viscous Hamilton--Jacobi Equations with Convex Nonlinearities |
| title_full | Stochastic Homogenization of Monotone Systems of Viscous Hamilton--Jacobi Equations with Convex Nonlinearities |
| title_fullStr | Stochastic Homogenization of Monotone Systems of Viscous Hamilton--Jacobi Equations with Convex Nonlinearities |
| title_full_unstemmed | Stochastic Homogenization of Monotone Systems of Viscous Hamilton--Jacobi Equations with Convex Nonlinearities |
| title_short | Stochastic Homogenization of Monotone Systems of Viscous Hamilton--Jacobi Equations with Convex Nonlinearities |
| title_sort | stochastic homogenization of monotone systems of viscous hamilton jacobi equations with convex nonlinearities |
| work_keys_str_mv | AT fehrmanb stochastichomogenizationofmonotonesystemsofviscoushamiltonjacobiequationswithconvexnonlinearities |