Explore a 22-minute video lecture detailing groundbreaking AI developments in solving Hamiltonian mechanics through novel neural network architectures. Dive into the technical innovations of VaRONet and MambONet, which frame Hamilton's equations as operator learning problems. Learn how VaRONet incorporates variational autoencoder principles with recurrent neural networks, while MambONet combines Mamba blocks and transformer decoders for efficient handling of long-range dependencies. Understand how these architectures surpass traditional models like DeepONet and TraONet in mapping potential functions to time-dependent trajectories, eliminating the need for explicit differential equation solving. Progress through topics including operator theory fundamentals, Gaussian random fields, B-splines implementation, and comprehensive evaluation results. Examine the implications for physics computation without differential equations, current AI limitations, phase space symmetries, and the connections between Poisson brackets and quantum commutators. Based on recent research papers, including "Neural Hamilton: Can A.I. Understand Hamiltonian Mechanics?" and related works on operator learning and hyperbolic learning rates. Read more