Modular symbols have a normal distribution YN Petridis, MS Risager Geometric & Functional Analysis GAFA 14, 1013-1043, 2004 | 50 | 2004 |
Quantum unique ergodicity for SL2 (O)\H3 and estimates for L-functions Y Petridis, P Sarnak J. Evol. Equ 1 (3), 277-290, 2001 | 42 | 2001 |
On squares of eigenfunctions for the hyperbolic plane and a new bound on certain L-series YN Petridis International Mathematics Research Notices 1995 (3), 111-127, 1995 | 36 | 1995 |
Arithmetic statistics of modular symbols YN Petridis, MS Risager Inventiones mathematicae 212, 997-1053, 2018 | 28 | 2018 |
Local average in hyperbolic lattice point counting, with an appendix by Niko Laaksonen YN Petridis, MS Risager Mathematische Zeitschrift 285, 1319-1344, 2017 | 28 | 2017 |
Spectral deformations and Eisenstein series associated withmodular symbols YN Petridis International Mathematics Research Notices 2002 (19), 991-1006, 2002 | 25 | 2002 |
Equidistribution of geodesics on homology classes and analogues for free groups YN Petridis, MS Risager Walter de Gruyter GmbH & Co. KG 20 (5), 783-815, 2008 | 17 | 2008 |
The remainder in Weyl's law for Heisenberg manifolds YN Petridis, JA Toth Journal of Differential Geometry 60 (3), 455-483, 2002 | 17 | 2002 |
The distribution of values of the Poincaré pairing for hyperbolic Riemann surfaces YN Petridis, MS Risager Walter de Gruyter 2005 (579), 159-173, 2005 | 16 | 2005 |
On Kummer's conjecture MR Murty, YN Petridis Journal of Number Theory 90 (2), 294-303, 2001 | 14 | 2001 |
Quantum limits of Eisenstein series and scattering states YN Petridis, N Raulf, MS Risager Canadian Mathematical Bulletin 56 (4), 814-826, 2013 | 13 | 2013 |
The remainder in Weyl’s law for 𝑛-dimensional Heisenberg manifolds M Khosravi, Y Petridis Proceedings of the American Mathematical Society 133 (12), 3561-3571, 2005 | 13 | 2005 |
The remainder in Weyl’s law for Heisenberg manifolds II D Chung, YN Petridis, J Toth submitted to the Proceedings of the Session: Analytic Number Theory and …, 2002 | 12 | 2002 |
Dissolving of cusp forms: higher-order Fermi’s golden rules YN Petridis, MS Risager Mathematika 59 (2), 269-301, 2013 | 11 | 2013 |
Spectral data for finite volume hyperbolic surfaces at the bottom of the continuous spectrum YN Petridis Journal of functional analysis 124 (1), 61-94, 1994 | 11 | 1994 |
On the number of Fourier coefficients that determine a Hilbert modular form S Baba, K Chakraborty, Y Petridis Proceedings of the American Mathematical Society 130 (9), 2497-2502, 2002 | 10 | 2002 |
The hyperbolic lattice point problem in conjugacy classes D Chatzakos, YN Petridis Forum Mathematicum 28 (5), 981-1003, 2016 | 9 | 2016 |
Perturbation of scattering poles for hyperbolic surfaces and central values of L-series YN Petridis | 8 | 2000 |
Double Dirichlet series and quantum unique ergodicity of weight one-half Eisenstein series Y Petridis, N Raulf, M Risager Algebra & Number Theory 8 (7), 1539-1595, 2014 | 7 | 2014 |
Double Dirichlet series and quantum unique ergodicity of weight one-half Eisenstein series Y Petridis, N Raulf, M Risager Algebra & Number Theory 8 (7), 1539-1595, 2014 | 7 | 2014 |