Jesse K Silliman, Assistant Research Professor
I am interested in number theory, algebraic geometry, and representation theory. More specifically, my research involves the arithmetic and algebraic properties of Eisenstein series, as well as applications to the study of special values of zeta functions.  Contact Info:
Office Location:   Office Phone:  (919) 6602800  Email Address:   Teaching (Fall 2020):
 MATH 218D.001, MATRICES AND VECTOR SPACES
Synopsis
 Online ON, MW 12:00 PM12:50 PM
 MATH 218D.01D, MATRICES AND VECTOR SPACES
Synopsis
 Online ON, F 10:15 AM11:05 AM
 MATH 218D.02D, MATRICES AND VECTOR SPACES
Synopsis
 Online ON, F 12:00 PM12:50 PM
 MATH 218D.03D, MATRICES AND VECTOR SPACES
Synopsis
 Online ON, F 01:45 PM02:35 PM
 MATH 218D.04D, MATRICES AND VECTOR SPACES
Synopsis
 Online ON, F 03:30 PM04:20 PM
 Education:
Ph.D.  Stanford University  2019 
 Keywords:
Algebraic geometry • Algebraic number theory • Arithmetical algebraic geometry • Number theory • Representation theory
 Recent Publications
 Silliman, J; Vogt, I, Powers in Lucas sequences via Galois representations,
Proceedings of the American Mathematical Society, vol. 143 no. 3
(November, 2014),
pp. 10271041, American Mathematical Society (AMS) [doi]
