Explore a mathematical seminar presentation examining recent developments in the quantum unique ergodicity conjecture for hyperbolic arithmetic manifolds, with particular focus on higher-dimensional cases beyond the previously resolved congruence surfaces by Lindenstrauss. Delve into the complex challenges that emerge when working with higher-dimensional manifolds through research conducted jointly with Alexandre de Faveri and Lior Silberman. Learn about the distribution of Hecke--Maass forms on hyperbolic arithmetic manifolds and gain insights into the fundamental conjecture originally proposed by Rudnick and Sarnak.
On the Quantum Unique Ergodicity Conjecture for Hyperbolic Arithmetic Manifolds
Institute for Advanced Study via YouTube
Overview
Syllabus
pm|Simonyi Classroom S-114
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Institute for Advanced Study
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