Papers and talks
Papers and talks
Polynomially effective equidistribution for certain unipotent subgroups in quotients of perfect Lie groups
Submitted. 74 pages, 1 figure. arXiv.
Translation Surfaces arising from Right Regular Prisms (with Xun Gong and Anthony Sanchez)
Submitted. 21 pages, 6 figures. arXiv.
Projection Theorems in the Presence of Expansions (with Ko Woon Ohm)
Submitted. 14 pages. arXiv.
Restricted projections and Fourier decoupling in Qp^n (with Ben Johnsrude)
Preprint. 50 pages, 2 figures. arXiv.
Polynomial effective density in quotient of SL2(Qp)×SL2(Qp)
Submitted. 39 pages. arXiv.
Finitary estimates for the distribution of lattice orbits in homogeneous spaces I: Riemannian metric (with Pratyush Sarkar)
Journal d'Analyse Mathématique. Accepted. 73 pages, 3 figures. arXiv.
Talks
Polynomially effective equidistribution for some higher dimensional unipotent subgroups in Joint IAS/PU Groups and Dynamics Seminar, IAS, May 2026.
Polynomial effective equidistribution for some unipotent subgroups in Fudan Dynamics, SCMS, Jan 2026.
Polynomial effective equidistribution for some higher dimensional unipotent subgroups in New England Dynamics and Number Theory Seminar, Zoom, Dec 2025.
Polynomial effective equidistribution for some higher dimensional unipotent subgroups in Northwestern Dynamical Systems Seminar, Northwestern University, Nov 2025.
Effective version of Oppenheim conjecture in dimension 4 in Stanford student analytic number theory seminar, Stanford University, Oct 2025.
Effective Oppenheim conjecture in dimension 4 (5 min lightning talk) in Research Groups in Analysis 2025, University of Pennsylvania, Aug 2025.
Distribution of dense lattice orbits on homogeneous spaces in UC San Diego Group Actions Seminar, UC San Diego, Dec 2023.
Quadratic forms of signature (2,2) or (3,1) I: effective equidistribution in quotients of SL4(R)
Not intend to publish, superceded by Polynomially effective equidistribution for certain unipotent subgroups in quotients of perfect Lie groups. arXiv.
A total curvature estimate of closed hypersurfaces in non-positively curved symmetric spaces (with Jiangtao Li and Liang Xu)
Not intend to publish. 11 pages. arXiv.