my research students
In reverse chronological order:
- Dev Hegde anticipated May 2023
- Joe Dickinson
anticipated May 2023
- Adrienne Sands
Sept 2020 Automorphic Hamiltonians, Epstein zeta functions, and
Kronecker limit formulas
- Kim Klinger-Logan,
May 2019 Differential equations in automorphic forms
- Iver Walkoe, April 2019 Meromorphic continuation of
Eisenstein series on Q-rank one arithmetic
quotients
- Adil Ali, 2015, Boundary-value problems on spaces of
automorphic forms
- Amy
DeCelles, 2011, Automorphic partial differential equations and
spectral theory with applications to number theory
- Joao Boavida, 2009, Compact periods of Eisenstein
series on orthogonal groups
- Delia Samuel, 2009, Subconvex bounds in conductor-depth
aspect for GL(2) automorphic L-functions
- Feryal Alayont , 2003, Residues of Eisenstein series
- Cetin Urtis ,
2002, Integral representations of L-functions and
Siegel-Weil-Kudla-Rallis formulas
- Nick
Lanphier , 2000, Special values of L-functions attached to a
class of cuspforms on symplectic similitude groups
- Doris Chiang, 1998, Andrianov's Integral for Unitary Groups
-
Jeremy Case , 1995, Analytic continuation and rationality of
Euler factors in integral representations of L-functions for classical
groups
- Michael Ellman, 1994, Analysis of integrals arising as local
factors in L-functions
- Lu Cheng, 1993, Eisenstein series and rationality of
automorphic L-functions on anisotropic unitary groups over function
fields
- Rama Kumanduri, 1993, Euler factors of global integrals
- Okan Tekman , 1992, Special values of L-functions attached to
holomorphic cuspforms on orthogonal groups of hermitian type
- Jinghua Kuang, 1992, Siegel-Weil formulas and the basis
problem at square-free level
- Doug McDoniel, 1989, Siegel-Hilbert cuspforms attached to CM
extensions and application to periods of genus-2 Hecke eigenfunctions
- Tim Finnegan, 1989, Siegel-Hilbert modular forms of level one
over fields with narrow class number one are theta series
- Dae-San Kim, 1989, Galois symmetric square L-functions
Unless explicitly noted otherwise, everything here, work
by Paul Garrett, is licensed
under a Creative
Commons Attribution 3.0
Unported License.
...
[ garrett@math.umn.edu ]
The University of Minnesota explicitly requires that I
state that "The views and opinions expressed in this page are
strictly those of the page author. The contents of this page have not
been reviewed or approved by the University of Minnesota."