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.

intended as the pure-math satellite conference of the recent String-Math 2012 meeting: The conference focuses on the topological aspects of the series of String-Math meetings. It aims to engage the ...

In a special case our unitary group takes the form $G = \{g \in \mathrm{GL}(p + 2, C)\mid^t\bar gRg = R\}$. Here $R = \begin{pmatrix}S & 0 & 0 \\ 0 & 0 & 1 \\ 0 & -1 ...

Abstract: The study of the distribution values of L-functions at the point s = 1 is a classical topic in analytic number theory which goes back to Chowla and Erdös. For some time, this question has ...

An illustration of a magnifying glass. An illustration of a magnifying glass.

Monogenic automorphic forms are exactly the 0-hypermonogenic automorphic forms. In the first part we establish an explicit relation between $k$-hypermonogenic automorphic forms and Maa {\ss} wave ...

We discuss how modular forms and automorphic forms can be written as infinite products, and how some of these infinite products appear in the theory of generalized Kac-Moody algebras. This paper is ...

Our research group is concerned with two lines of investigation: the construction and study of (new) cohomology theories for algebraic varieties and the study of various aspects of the Langlands ...

Conformal Field Theory, Automorphic Forms and Related Topics 19-23 September 2011.

`Small Scale Equidistribution of Hecke Eigenforms at Infinity', (with A.C.Nordentoft, M.S.Risager), Journal of the London Math. Society, doi.org/10.1112/jlms.12645 ...