Singular Higher-order Linearized Monge-Ampère Type Equations with Drifts — NSF Award to Indiana University (IN, $252,563)
This project studies several nonlinear partial differential equations that are relevant to applications in science, economics, engineering, meteorology, and physics. They also have deep connections and applications in several areas of mathematics such as analysis, geometry, numerical methods, and the calculus of variat
| Award title | Singular Higher-order Linearized Monge-Ampère Type Equations with Drifts |
|---|---|
| Award ID | 2452320 |
| Awardee | Indiana University |
| City | BLOOMINGTON |
| State | IN |
| Amount obligated | $252,563 |
| Principal investigator | Nam Le |
| Program | ANALYSIS PROGRAM |
| Start date | 07/15/2025 |
| Abstract | This project studies several nonlinear partial differential equations that are relevant to applications in science, economics, engineering, meteorology, and physics. They also have deep connections and applications in several areas of mathematics such as analysis, geometry, numerical methods, and the calculus of variations. For example, among the equations investigated in this project, the semigeostrophic equations are used in weather forecasting, while singular affine maximal surface equations |
| Source | NSF Awards |
$799/mo
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