Omer Angel
Professor Omer Angel has been appointed as a Clay Senior Scholar from January to May 2025 to participate in Probability and Statistics of Discrete Structures at the Simons Laufer Mathematical Research Institute.
Professor Omer Angel has been appointed as a Clay Senior Scholar from January to May 2025 to participate in Probability and Statistics of Discrete Structures at the Simons Laufer Mathematical Research Institute.
Huy Tuan Pham will receive his PhD in 2023 from Stanford University, where he is advised by Jacob Fox.
Pham is a highly inventive and prolific researcher who has already made fundamental contributions to combinatorics, probability, number theory, and theoretical computer science. While still an undergraduate, he showed with Fox and Zhao that Green’s popular difference theorem, an extension of Roth’s theorem on arithmetic progressions in dense sets of integers, requires tower-type bounds – the first known application of Szemerédi’s regularity method that truly requires tower-type bounds. Subsequently, with Park, he proved the Kahn-Kalai conjecture on the location of phase transitions and Talagrand’s conjecture on selector processes; with Conlon and Fox, he solved various long-standing conjectures of Erdős in additive combinatorics concerning subset sums and Ramsey complete sequences; and with Cook and Dembo, he developed a quantitative nonlinear large deviations theory for random hypergraphs.
Huy Tuan Pham has been appointed as a Clay Research Fellow for five years beginning 1 July 2023.
Paul Minter obtained his PhD in 2022 from the University of Cambridge, advised by Neshan Wickramasekera. Since then he has been a Veblen Research Instructor at Princeton University/IAS and a Junior Research Fellow at Homerton College, Cambridge.
Minter works in Geometric Measure Theory, tackling regularity and compactness questions for minimal hypersurfaces in Riemannian manifolds. He has advanced the subject by introducing powerful new techniques for analysing singularities of measure-theoretically defined minimal hypersurfaces with stable regular part, establishing, in particular, the uniqueness of classical tangent cones when they arise, and (with Wickramasekera) the uniqueness of tangent hyperplanes at branch points, in the absence of lower density classical singularities nearby. His remarkably general results – the first with no restrictions on multiplicity or the dimension of the hypersurface – provide a much sought-after extension to what is known about uniqueness of tangent cones and the asymptotic behaviour of minimal submanifolds near singularities. Applications include an understanding of the structure of area minimising hypersurfaces mod p, for any even integer p, near a singular point with a planar tangent cone.
Paul Minter has been appointed as a Clay Research Fellow for four years beginning 1 July 2023.
Photo: Dan Komoda, Institute for Advanced Study
Hannah Larson will obtain her PhD in 2022 from Stanford University, where she has been advised by Ravi Vakil.
Displaying remarkable ingenuity, Larson has applied the modern techniques of degeneration and intersection theory to make significant advances in one of the classical areas of algebraic geometry – the geometry of complex curves and their moduli. Her papers bristle with surprising new ideas that attack classical problems. For example, searching for new perspectives on the space of vector bundles on the Riemann sphere, she proved striking results about the moduli space of curves and about stabilization forbranched covers of the sphere (with Canning), and extended Brill-Noether theory (which governs maps of general curves to projective space) to explain seemingly chaotic behaviour in the case of low-gonality curves (with E. Larson and Vogt).
Hannah was appointed as a Clay Research Fellow for a term of five years beginning 1 July 2022.
Alexander Petrov will obtain his PhD in 2022 from Harvard University, where he has been advised by Mark Kisin.
Petrov has demonstrated exceptional creativity in proving surprising theorems concerning Galois representations and arithmetic local systems on algebraic varieties. Settling a conjecture of Litt, he proved that geometrically irreducible, arithmetic local systems on varieties over p-adic fields are essentially de Rham. He discovered a deep generalization of Belyi’s famous theorem, showing that any irreducible Galois representation which arises in the cohomology of an algebraic variety over a number field, appears in the space of algebraic functions on the fundamental group of the thrice punctured sphere. And he opened a new range of possibilities with counterexamples to a conjecture of Scholze on Hodge symmetry for rigid analytic varieties.
Alexander was appointed as a Clay Research Fellow for a term of five years beginning 1 July 2022.
Amol Aggarwal received his PhD in 2020 from Harvard University, where he was advised by Alexei Borodin. His research lies largely in probability theory and combinatorics, as well as their connections to mathematical physics, integrable systems, and dynamical systems.
Aggarwal has already established himself as a powerful mathematician, resolving several longstanding conjectures of broad interest. His achievements to date include his proof of the local statistics conjecture for lozenge tilings, prescribing how local correlations for random tilings of large domains asymptotically depend on their boundary conditions. He also provided rigorous proofs for predicted phase transitions in the six-vertex model — a fundamental system from statistical mechanics — and for predicted asymptotic distributions in the one-dimensional asymmetric simple exclusion process, an important prototype for interacting particle systems. In a different direction, he proved the conjecture of Eskin and Zorich describing large genus asymptotics of the Masur-Veech volumes and the Siegel-Veech constants of moduli spaces of Abelian differentials.
Amol was appointed as a Clay Research Fellow for a term of five years from 1 July 2020.