Chris Judge
Mathematics · Indiana University
Publications
39
Citations
453
Est. group size
—
Recurring co-author estimate
Active years
31
Publishing since 1996
Chris Judge works in mathematics, focusing on the geometry and analysis of surfaces and shapes. A central strand studies how vibrations and wave patterns behave on geometric objects (spectral theory of the Laplacian, including nodal sets and eigenfunctions on polygons and surfaces), alongside work on translation surfaces and abelian differentials, which are geometric structures built from flat surfaces with special coordinate patterns.
Output has been relatively steady at roughly one to two papers per year, with a noticeable peak in 2022.
Generated by claude-opus-4-8 from public bibliographic data · Jul 11, 2026
- Affine mappings of translation surfaces: shrinking targets and Diophantine properties
Open MIND · 2026
- Affine mappings of translation surfaces: shrinking targets and Diophantine properties
arXiv (Cornell University) · 2026
- Some remarks on critical sets of Laplace eigenfunctions
Annales mathématiques du Québec · 2025
- Generic simplicity of ellipses
arXiv (Cornell University) · 2024
- Spectral Multiplicity and Nodal Domains of Torus-Invariant Metrics
International Mathematics Research Notices · 2023
- Erratum: Euclidean triangles have no hot spots
Annals of Mathematics · 2022
- Critical points of Laplace eigenfunctions on polygons
Communications in Partial Differential Equations · 2022
- Examining the Effects of Irradiation Temperature on Defect Generation and the Nature of Dislocation Loops
arXiv (Cornell University) · 2022
- Some remarks on critical sets of Laplace eigenfunctions
arXiv (Cornell University) · 2022
- Spectral multiplicity and nodal sets for generic torus-invariant metrics
arXiv (Cornell University) · 2022
- Haupt’s theorem for strata of abelian differentials
Israel Journal of Mathematics · 2022
- Critical points of Laplace eigenfunctions on polygons
arXiv (Cornell University) · 2021
- The Wateree Bug: Hellgrammites, Dobsonflies, and Mississippian Period Potters
Scholar Commons (University of South Carolina) · 2020
- Haupt's theorem for strata of abelian differentials
arXiv (Cornell University) · 2020
- The maximum number of systoles for genus two Riemann surfaces with abelian differentials
Commentarii Mathematici Helvetici · 2019
- arXiv (Cornell University)×9
- Annals of Mathematics×2
- Israel Journal of Mathematics×1
- Communications in Partial Differential Equations×1
- Annales mathématiques du Québec×1
This profile was generated automatically from public scholarly data (OpenAlex). Group size and activity levels are estimates derived from co-authorship patterns.
Last updated Jul 11, 2026.
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