Lecture 16: Finite Section Method for Approximation of Koopman Operators: Part 3 Published 2022-04-21 Download video MP4 360p Recommendations 48:16 Lecture 15: Finite Section Method for Approximation of Koopman Operators: Part 2 30:31 Lecture 14: Finite Section Method for Approximation of Koopman Operators: Part 1 47:47 Lecture3:Generator 39:03 Lecture12 CarlemanLinearization 1:06:54 ME203Lecture2:Eigenfunctions 56:03 Lecture13GeneralizedLaplaceAnalysis 09:09 HARD INDIAN Olympiads Trick | No Calculator Allowed | Can You Try ? 1:05:38 ME203Lecture1:Introduction 36:26 Cosmology in Crisis? Confronting the Hubble Tension 11:14 The Man Who Solved the World’s Hardest Math Problem 28:47 Michio Kaku: "Time Does NOT EXIST! James Webb Telescope PROVED Us Wrong!" 10:03 Newton's Geometric Calculus 13:09 Lecture5 : History, Discussion and Reading 51:34 Lecture10 MultipleBasinsofAttractionandStability 30:32 Lecture3:Partitions 24:09 Lecture5 : Linear Systems 1 37:13 Lecture4 AsymptoticDynamics RegularAttractors 19:50 An Attempted Proof Of The Riemann Hypothesis w/ Theta Functions 52:02 Lecture8 Eigenfunctions as Coordinates in Linear Systems,Spectral Expansion for NonlinearObservables 11:55 Brian Cox: The Universe Existed Before The Big Bang Similar videos 47:55 Mario Sznaier - A Convex Optimization Approach to Learning Koopman Operators from Data 13:17 Modern Numerical Programming with Julia for Astrodynamic Trajectory Design | Dan Padilha 04:55 DeSKO: Stability-Assured Robust Control with a Deep Stochastic Koopman Operator 16:34 Residual Dynamic Mode Decomposition: A very easy way to get error bounds for your DMD computations 16:01 Koopman Spectral Analysis (Representations) 03:51 On the Utility of Koopman Operator Theory in Learning Dexterous Manipulation Skills 24:47 Glaura Franco - Poisson Models for Time Series of Counts 1:29:31 Research Seminar Series 22 (06-FEB-2022) - Introduction to Koopman Operator by Shrenik 58:12 DeepOnet: Learning nonlinear operators based on the universal approximation theorem of operators. 49:50 Claude Bardos: Quasilinear approximation of Vlasov and Liouville equations 21:58 Spectral Theorem for Compact Operators, and Coming back to my office after 2 years. 36:07 Learning Dynamical Systems More results