The goal of the symposium is to forge new connections between faculty and students in Utah who are working on representation theory, algebra and number theory and related fields.

Next meeting: Saturday March 22, 2025

Location: University of Utah, LCB 219 and 222 (campus map)

Speakers

Petar Bakic (University of Utah)

Matthew Bertucci (University of Utah)

Daniel Gulotta (University of Utah)

Andreas Malmendier (Utah State University)

Mitchell Pound (Utah State University)

Schedule

10am-11am: Andreas Malmendier On two-elementary K3 surfaces with finite automorphism group

11am-11:30am: Coffee break

11:30am-12pm: Matthew Bertucci Generalized Bertini Theorems over Finite Fields

12pm-1pm: Lunch

1pm-2pm: Petar Bakic Fourier coefficients and L-values for modular forms on G_2

2pm-2:30pm: Coffee break

2:30pm-3pm: Mitchell Pound Towards generalized abelianizations of symplectic quotients

3:30pm-4:30pm: Daniel Gulotta Generalizing local Jacquet-Langlands via Hecke correspondences

Registration: All are welcome to attend. We ask that all participants please register here to facilitate planning. (You can email Matt Young (matthew.young@usu.edu) directly if you do not have a gmail account.) We do not have general funding to support participation.

Organizers: Petar Bakic (Utah), Peter Crooks (USU), Sean Howe (Utah) and Matt Young (USU)