The singularity spectrum of Lévy processes in multifractal time J Barral, S Seuret Advances in Mathematics 214 (1), 437-468, 2007 | 80* | 2007 |
The local Hölder function of a continuous function S Seuret, JL Véhel Applied and Computational Harmonic Analysis 13 (3), 263-276, 2002 | 79 | 2002 |
From multifractal measures to multifractal wavelet series J Barral, S Seuret Journal of Fourier Analysis and Applications 11 (5), 589-614, 2005 | 61 | 2005 |
The 2-microlocal formalism JL Véhel, S Seuret Fractal geometry and Applications: A jubilee of Benoit Mandelbrot, Proc …, 2004 | 61* | 2004 |
Heterogeneous ubiquitous systems in ℝ d and Hausdorff dimension J Barral, S Seuret Bulletin of the Brazilian Mathematical Society, New Series 38, 467-515, 2007 | 51* | 2007 |
Combining multifractal additive and multiplicative chaos J Barral, S Seuret Communications in mathematical physics 257, 473-497, 2005 | 48* | 2005 |
A time domain characterization of 2-microlocal spaces S Seuret, J Lévy Véhel Journal of Fourier Analysis and Applications 9, 473-495, 2003 | 48 | 2003 |
A pure jump Markov process with a random singularity spectrum J Barral, N Fournier, S Jaffard, S Seuret | 44 | 2010 |
Diophantine approximation by orbits of expanding Markov maps L Liao, S Seuret Ergodic Theory and Dynamical Systems 33 (2), 585-608, 2013 | 37 | 2013 |
Quantitative recurrence properties in conformal iterated function systems S Seuret, BW Wang Advances in Mathematics 280, 472-505, 2015 | 33 | 2015 |
Ubiquity and large intersections properties under digit frequencies constraints J Barral, S Seuret Mathematical Proceedings of the Cambridge Philosophical Society 145 (3), 527-548, 2008 | 31 | 2008 |
The multifractal nature of heterogeneous sums of Dirac masses J Barral, SEP Seuret Mathematical Proceedings of the Cambridge Philosophical Society 144 (3), 707-727, 2008 | 30 | 2008 |
Multivariate multifractal analysis S Jaffard, S Seuret, H Wendt, R Leonarduzzi, S Roux, P Abry Applied and Computational Harmonic Analysis 46 (3), 653-663, 2019 | 28 | 2019 |
Typical Borel measures on [0, 1] d satisfy a multifractal formalism Z Buczolich, S Seuret Nonlinearity 23 (11), 2905, 2010 | 27 | 2010 |
Pointwise Hölder exponent estimation in data network traffic S Seuret, A Gilbert International Teletraffic Congress Workshop, Monterey, Canada, 2000 | 26 | 2000 |
Multifractal formalisms for multivariate analysis S Jaffard, S Seuret, H Wendt, R Leonarduzzi, P Abry Proceedings of the Royal Society A 475 (2229), 20190150, 2019 | 25 | 2019 |
Dimensions of some fractals defined via the semigroup generated by 2 and 3 Y Peres, J Schmeling, S Seuret, B Solomyak Israel Journal of Mathematics 199, 687-709, 2014 | 25 | 2014 |
A localized Jarník–Besicovitch theorem J Barral, S Seuret Advances in Mathematics 226 (4), 3191-3215, 2011 | 23 | 2011 |
Inside singularity sets of random Gibbs measures J Barral, S Seuret Journal of statistical physics 120, 1101-1124, 2005 | 23 | 2005 |
Large deviations estimates for the multiscale analysis of heart rate variability P Loiseau, C Médigue, P Gonçalves, N Attia, S Seuret, F Cottin, D Chemla, ... Physica A: Statistical Mechanics and its Applications 391 (22), 5658-5671, 2012 | 21 | 2012 |