T. S. Eliot
Assistant Professor (rtd-B) in Probability and Mathematical Statistics at Università del Piemonte Orientale.
Previously: Assistant Professor (rtd-A) in Probability and Mathematical Statistics at Sapienza University of Rome
Research Interests
Main field: Probability Theory and Mathematical Statistics
Main topic: The Geometry of Random Fields on the Sphere
Published papers
Grotto, F.; Maini, L.; Todino, A. P. Fluctuations of Polyspectra in Spherical and Euclidean Random Wave Models, Electron. Commun. Probab. 29: 1-12 (2024). Arxiv.
Bourguin, S.; Durastanti, C.; Marinucci, D.; Todino, A. P. Spherical Poisson Waves, Electronic Journal of Probability, 29, 1–27 (2024). Article.
Todino, A. P. No smooth phase transition for the Nodal Length of Band-limited Spherical Random Fields, Stochastic Processes and their Applications, Volume 169, 104273 (2024). Article
Durastanti, C.; Marinucci, D.; Todino, A. P. Flexible-bandwidth Needlets, Bernoulli 2024, Vol. 30, No. 1, 22-45. Article.
Shevchenko, R.; Todino, A.P. Asymptotic Behaviour of Level Sets of Needlet Random Fields, Stochastic Processes and their Applications, Volume 155, Pages 268-318 (2023). Article
Todino, A. P. Limiting Behavior for the Excursion Area of Band-Limited Spherical Random Fields, Electron. Commun. Probab. 27 1 - 12, 2022. Article
Cammarota, V.; Todino, A. P. On the Correlation between Critical points and Critical values for Random Spherical Harmonics, Theory of Probability and Mathematical Statistics, 106, 41-62 (2022). Article.
Macci, C.; Rossi, M.; Todino, A. P. Moderate Deviation estimates for Nodal Lengths of Random Spherical Harmonics, Latin American Journal of Probability and Mathematical Statistics 18, 249–263 (2021). Article
Todino, A. P. Nodal Lengths in Shrinking Domains for Random Eigenfunctions on S2, Bernoulli 26 (4), 3081-3110 (2020). Article
Fantaye, Y.; Cammarota, V.; Marinucci, D.; Todino, A. P. A Numerical Investigation on the High-Frequency Geometry of Spherical Random Eigenfunctions, High Frequency 2 (3-4), 184-201 (2019). Article
Todino, A. P. A Quantitative Central Limit Theorem for the Excursion Area of Random Spherical Harmonics over Subdomains of S2, J. Math. Phys. 60 (2), 023505 (2019). Article
Others
Local Geometry of Random Spherical Harmonics. PhD thesis (2019). Link.