Explores the history, theory, and applications of optimal transport in various fields, showcasing its importance in solving complex mathematical problems.
Explores canonical transformations, their properties, and applications in Hamiltonian mechanics, emphasizing their role in simplifying the analysis of complex systems.
Explores curve integrals, demonstrating properties and real-life applications, including tunnel excavation and safety assessment based on crime density.
Explores computing the leading eigenvalue of a transfer operator beyond periodic points, focusing on mathematical settings, spectral radius estimation, and the Zaremba Conjecture.
