Gradient flows in Hilbert spaces: Difference between revisions
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<!-- '''Gradient Flows in Hilbert Spaces''' are generalizations of time-derivatives with a gradient constraint. Specifically, a gradient flow is a Hilbert Space valued function who's time derivative lies in some generalized collection of gradient vectors. Gradient flows are a key topic in the study of non-linear time evolution partial differential equations. !--> | <!-- '''Gradient Flows in Hilbert Spaces''' are generalizations of time-derivatives with a gradient constraint. Specifically, a gradient flow is a Hilbert Space valued function who's time derivative lies in some generalized collection of gradient vectors. Gradient flows are a key topic in the study of non-linear time evolution partial differential equations. !--> | ||
<!-- ==Introduction== --!> | |||
<!-- ==References== <ref>Ambrosio, Brue, Semola; Lectures on Optimal Transport</ref>, <ref>Evans; PDEs</ref>--!> | |||
Revision as of 21:07, 7 February 2022
Editing in progress. Edits will be rendered when the draft is complete.