In reverse chronological order:

• Marcella Manivel, anticipated 2027
• Dev Hegde, anticipated May 2024
• Joe Dickinson, August 2023, Automorphic spectral analysis of a self-adjoint operator attached to a triple-product L-function
• 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