Here is a list of registered participants who opted to make their information available on this website. If you did not "opt in" on the registration form but would still like your information to appear below, please email Abbey Bourdon (bourdoam@wfu.edu).
*= actively on the job market
Michael Allen* (Louisiana State University): Modular forms, broadly construed, and hypergeometric functions
Santiago Arango-Piñeros* (Emory University): Arithmetic geometry
Dante Bonolis* (Duke University): Analytic number theory, arithmetic geometry
Abbey Bourdon (Wake Forest University): Arithmetic geometry
Matthew Boylan (University of South Carolina): Modular forms
Rena Chu* (Duke University): Analytic number theory, character sums
Adama Hawa Cisse (Brock University): I work on Elliptic curves and application to Cryptography.
Pete Clark (University of Georgia): Mostly number theory
Steven Creech (Brown): Automorphic forms, Spectral Theory, L-functions
Alejandro De Las Penas Castano (University of Virginia): Number Theory, Arithmetic Geometry
Joseph DiCapua* (CUNY Graduate Center): Iwasawa theory, explicit local class field theory, and algebraic number theory
Noah Feggeler (Wake Forest University): Algebra
Michael Filaseta (University of South Carolina)
Samir Fridhi (University of Virginia): Automorphic forms, L-functions, Langlands program
Wendi Gao (Virginia Tech): Isogeny based cryptography
Tyler Genao* (Ohio State University): Arithmetic geometry and number theory
Wissam Ghantous (University of Central Florida): Computational Number theory and its applications to cryptography
Asimina Hamakiotes* (University of Connecticut): Arithmetic geometry, algebraic number theory
Raul Hernandez-Gonzalez (University of Virginia): Analytic Number Theory, Automorphic Forms, Modular Forms
Haoxi Hong (University of Tennessee, Knoxville): My current research interest lies in arithmetic geometry.
Peter Humphries (University of Virginia): A fundamental conjecture in number theory is the Riemann hypothesis, which implies the prime number theorem with an optimally strong error term. While a proof remains elusive, many results in number theory can nonetheless be proved using weaker inputs. I will discuss how one such weaker input, subconvexity, can be used to prove strong results on the equidistribution of geometric objects such as lattice points on the sphere. If time permits, I will also discuss how various proofs of subconvexity reduce to understanding period integrals of automorphic forms.
Aditya Iyer (University of South Carolina): I am interested in arithmetic statistics and sieve theory.
Bobby Jacobs* (Virginia Commonwealth University): Number theory, graph theory
Aashraya Jha* (Boston University): I am interested in computational arithmetic geometry. Projects I have been involved so far are the determination of rational/integral points of curves of interest and computing invariants of modular curves.
Alexandros Kalogirou* (University of South Carolina): Probabilistic methods, polynomial irreducibility.
Zubin Kaul (University of Virginia)
Jonah Klein (University of South Carolina): Number theory and combinatorics
John Layne (University of Virginia): Analytic number theory
Jin Lee (Duke University): Limits of discrete series and automorphic representations
Sung Min Lee* (Dakota State University): I am interested in Arithmetic Geometry, specifically using Galois Representations to study the distribution of primes with various properties associated with elliptic curves. I am looking to expand my research expertise into Abelian Varieties and Drinfeld Modules.
Oliver Lippard (University of North Carolina at Charlotte): Number Theory and Combinatorics
William Mahaney (Virginia Tech): My primary research interest is post-quantum cryptography, in particular isogeny based cryptography. I specifically focus on computational number theory and graph theory applied to isogeny based protocols.
Brendan Malaugh* (University of Virginia)
Shilpi Mandal* (Emory University): Local-Global principles, period-index problems, quadratic forms, Berkovich theory
Jacob Mayle* (Wake Forest University): My research is in arithmetic geometry, focusing on theoretical and computational problems related to the arithmetic of abelian varieties.
Caleb McWhorter (University of South Carolina): Number Theory
Alexis Newton* (Emory University): I am interested in Algebraic Geometry and Number Theory, with a preference for computational research.
Tianyu Ni* (Clemson University): Modular forms and related topics
Dimitrios Nikolakopoulos (University of Tennessee, Knoxville): I am more interested in Number Theory with combinatorial methods. I want to study more about Analytic Number Theory. I have studied a lot about Modular Forms, Partition Function, Integer Partitions, basics on Elliptic Curves, exploring Witt Vector Spaces and the elliptic Teichmüller Lift , Matroids Over One-Dimensional Groups , Elliptic PDEs.
Zachary Parker (UNC Greensboro)
Andrew Paul (UNC Chapel Hill): Geometry/topology
Sebastian Pauli (UNC Greensboro): Computational number theory
Jeremy Rouse (Wake Forest University): Modular curves, rational points on curves, quadratic forms
Maximiliano Sanchez Garza (University of Virginia): Analytic Number Theory
Gabrielle Scullard (University of Georgia): Elliptic curves, abelian varieties, computing endomorphism rings, applications to isogeny-based cryptography
Shreya Sharma (University of South Carolina): Algebraic Geometry, birational geometry, automorphisms of algebraic varieties.
Pankaj Singh* (University of South Carolina): Algebraic geometry, Mackey functors, Finite group Representations, Galois Cohomology
Joshua Stucky (Georgia Tech): Prime Numbers, L-functions, and harmonic analysis
Yanhui Su (Clemson University): Modular Forms
Swati (University of South Carolina): Modular Forms, Partitions
Tingyu Tao* (University of California, Irvine): Analytic Number Theory (Moments of L-functions)
Frank Thorne (University of South Carolina): Analytic number theory and arithmetic statistics
Wei-Lun Tsai (University of South Carolina): Number theory
Tom Wright (Wofford College)
Hao Yun Yao (Duke University): Currently interested in automorphic representation towards trace formula, but also interested in analytic number theory.
Dan Yasaki (UNC Greensboro): Number theory
Bobby (Zixuan) Zhang (Duke University): Automorphic representations, trace formulae
Lixin Zheng (University of Maryland, College Park): Algebra, Number Theory