Andrei Draganescu, Ph.D.
Affiliations: | 2004 | University of Chicago, Chicago, IL |
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"Andrei Draganescu"Mean distance: 13.74 | S | N | B | C | P |
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Sign in to add mentor| Todd F. Dupont | grad student | 2004 | Chicago | |
| (Two investigations in numerical analysis: Monotonicity preserving finite element methods, and multigrid methods for inverse parabolic problems.) | ||||
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Publications
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| Soane AM, Draganescu A. (2019) Multigrid Preconditioners For The Newton-Krylov Method In The Optimal Control Of The Stationary Navier-Stokes Equations Siam Journal On Numerical Analysis. 57: 1494-1523 |
| Draganescu A, Saraswat J. (2016) Optimal-Order Preconditioners for Linear Systems Arising in the Semismooth Newton Solution of a Class of Control-Constrained Problems Siam Journal On Matrix Analysis and Applications. 37: 1038-1070 |
| Drǎgǎnescu A, Dupont TF. (2008) Optimal order multilevel preconditioners for regularized ill-posed problems Mathematics of Computation. 77: 2001-2038 |
| Drǎgǎnescu A, Dupont TF, Scott LR. (2005) Failure of the discrete maximum principle for an elliptic finite element problem Mathematics of Computation. 74: 1-23 |