Local global principles for representations of quadratic forms. In: Inventiones Mathematicae, Band 171, 2008, S. 257, arxiv:math/0604232.
Einsiedler, Lindenstrauss, Margulis, Venkatesh: Effective equidistribution for closed orbits of semisimple groups on homogeneous spaces. 2007, arxiv:0708.4040.
Einsiedler, Margulis, Mohammadi, Venkatesh: Effective equidistribution and property tau. 2015, arxiv:1503.05884, wird erscheinen in: J. Am. Math. Soc.
Manfred Einsiedler, Elon Lindenstrauss, Philippe Michel, Akshay Venkatesh: Distribution of periodic torus orbits and Duke’s theorem for cubic fields. In: Annals of Mathematics, Band 173, 2010, S. 815–885, 2007 arxiv:0708.1113.
Lindenstrauss, Venkatesh: Existence and Weyl’s law for spherical cusp forms. In: Geom. Funct. Anal. Band 17, 2007, S. 220–251, arxiv:math/0503724.
Silberman, Venkatesh: On Quantum unique ergodicity for locally symmetric spaces I. In: Geom. Funct. Anal. Band 17, 2007, S. 960–998, arxiv:math/0407413.
Ellenberg, Venkatesh: The number of extensions of a number field with fixed degree and bounded discriminant. In: Annals of Mathematics, Band 163, 2006, S. 723–741, arxiv:math/0309153.
Venkatesh: Sparse equidistribution problems, period bounds and subconvexity. In: Annals of Mathematics, Band 172, 2010, S. 989–1094, 2005 arxiv:math/0506224.
Michel, Venkatesh: Subconvexity Problem for GL(2). In: Pub. Math. IHES, Band 111, 2010, S. 171–280, arxiv:0903.3591.
Integral points on elliptic curves and 3-torsion in class groups. In: American J. Math. Band 19, 2006, S. 527, arxiv:math/0405180.
Ellenberg, Venkatesh, Westerland: Homological stability for Hurwitz spaces and the Cohen-Lenstra conjecture over function fields. In: Annals of Mathematics, Band 183, 2016, S. 729–786, 2009 arxiv:0912.0325.
Calegari, Venkatesh: A torsion Jacquet-Langlands correspondence.arxiv:1212.3847 Arxiv 2012.
Prasanna, Venkatesh: Automorphic cohomology, motivic cohomology, and the adjoint L-function. 2016, arxiv:1609.06370.
Lawrence, Venkatesh: Diophantine problems and p-adic period mappings. 2018, arxiv:1807.02721.
mathunion.org
“For his synthesis of analytic number theory, homogeneous dynamics, topology, and representation theory, which has resolved long-standing problems in areas such as the equidistribution of arithmetic objects.” Offizielle Website der IMU zur Fields-Medaille.