Non-escape of Mass for Arithmetic Quantum Limits on Hyperbolic 4-Manifolds
Institute for Advanced Study via YouTube
AI Engineer - Learn how to integrate AI into software applications
Launch Your Cybersecurity Career in 6 Months
Overview
Google, IBM & Meta Certificates – 40% Off
One plan covers every Professional Certificate on Coursera.
Unlock All Certificates
Explore the intricacies of the Arithmetic Quantum Unique Ergodicity (AQUE) conjecture in this advanced mathematics seminar. Delve into the groundbreaking research on non-escape of mass for Hecke-Maass cusp forms on congruence quotients of hyperbolic 4-space. Examine the challenges posed by unbounded terms in Hecke relations and discover innovative approaches using quaternionic matrices and non-commutative unique factorization. Learn how this work builds upon previous results for hyperbolic 2- and 3-manifolds, and understand its implications for the broader field of quantum ergodicity. Gain insights into the collaborative efforts of Alexandre de Faveri from Stanford University and Zvi Shem-Tov as they push the boundaries of our understanding in this complex area of mathematical physics.
Syllabus
Non-escape of Mass for Arithmetic Quantum Limits on Hyperbolic 4-Manifolds - Alexandre de Faveri
Taught by
Institute for Advanced Study