Dear colleagues,


I would like to invite you to the following online seminar organized by the Probability group of the University of Pisa. The two talks will be accessible under the link


Click here to join


Best regards,

Giacomo




Tuesday, June 8, 15:00


Speaker: Josué Corujo (Université Paris Dauphine)


Title: Spectrum and ergodicity of a neutral multi-allelic Moran model


Abstract: We will present some recent results on the study of a neutral
multi-allelic Moran model, which is a finite continuous-time Markov
process. For this process, it is assumed that the individuals interact
according to two processes: a mutation process where they mutate
independently of each other according to an irreducible rate matrix, and
a Moran type reproduction process, where two individuals are uniformly
chosen, one dies and the other is duplicated. During this talk we will
discuss some recent results for the spectrum of the generator of the
neutral multi-allelic Moran process, providing explicit expressions for
its eigenvalues in terms of the eigenvalues of the rate matrix that
drives the mutation process. Our approach does not require that the
mutation process be reversible, or even diagonalizable. Additionally, we
will discuss some applications of these results to the study of the
speed of convergence to stationarity of the Moran process for a process
with general mutation scheme. We specially focus on the case where the
mutation scheme satisfies the so called "parent independent" condition,
where (and only where) the neutral Moran model becomes reversible. In
this later case we can go further and prove the existence of a cutoff
phenomenon for the convergence to stationarity.

This presentation is based on a recently submitted work, for which a
preprint is available at https://arxiv.org/abs/2010.08809.




Tuesday, June 8, 16:00


Speaker: Willem Van Zuijlen (WIAS)


Title: Total mass asymptotics of the parabolic Anderson model


Abstract: We consider the parabolic Anderson model with a white noise potential in two dimensions. This model is also called the stochastic heat equation with a multiplicative noise. We study the large time asymptotics of the total mass of the solution. Due to the irregularity of the white noise, in two dimensions the equation is a priori not well-posed. Using paracontrolled calculus or regularity structures one can make sense of the equation by a renormalisation, which can be thought of as ''subtracting infinity of the potential''. To obtain the asymptotics of the total mass we use the spectral decomposition, an alternative Feynman-Kac type representation and heat-kernel estimates which come from joint works with Khalil Chouk, Wolfgang König and Nicolas Perkowski.







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Giacomo Di Gesù

Dipartimento di Matematica

Università di Pisa

Largo Bruno Pontecorvo 5

56127 - Pisa, Italy


giacomo.digesu@unipi.it


https://sites.google.com/site/giacomodigesu/