The study of automorphic forms and Lie theory stands at the intersection of analysis, geometry and arithmetic, providing a unifying framework that connects the spectral theory of differential ...

Automorphic forms and L-functions have long stood at the heart of modern number theory and representation theory, providing a profound link between symmetry, arithmetic, and spectral analysis.

The proof Wiles finally came up with (helped by Richard Taylor) was something Fermat would never have dreamed up. It tackled the theorem indirectly, by means of an enormous bridge that mathematicians ...

Analytic number theory; automorphic forms; and L-functions. Jakob Streipel's research centers around using GL(2) spectral theory in order to study automorphic forms coming from or being somehow ...

Canadian-American wins ‘maths Nobel’ for the Langlands program, which predicts unexpected connections between different fields Some mathematicians are immortalised by a theorem. Others by a conjecture ...

Mathematicians have figured out how to expand the reach of a mysterious bridge connecting two distant continents in the mathematical world. The proof Wiles finally came up with (helped by Richard ...