15/12/2020, 14:00 — 15:00 — Sala P3.10, Pavilhão de Matemática Online
Claudio Landim, Instituto Nacional de Matemática Pura e Aplicada
Static large deviations for a reaction-diffusion model
We examine the stationary state of an interacting particle system whose macroscopic evolution is described by one-dimensional reaction-diffusion equations.
Ver também
Stat-LD-RD.pdf
10/11/2020, 14:00 — 15:00 — Sala P3.10, Pavilhão de Matemática Online
Nina Gantert, Technische Universität München
Mixing times for the simple exclusion process with open boundaries
We study mixing times of the symmetric and asymmetric simple exclusion process on the segment where particles are allowed to enter and exit at the endpoints. We consider different regimes depending on the entering and exiting rates as well as on the rates in the bulk, and show that the process exhibits pre-cutoff and in some special cases even cutoff.
No prior knowledge is assumed.
Based on joint work with Evita Nestoridi (Princeton) and Dominik Schmid (Munich).
Projecto FCT UIDB/04459/2020.
13/10/2020, 14:00 — 15:00 — Sala P3.10, Pavilhão de Matemática Online
Persi Diaconis, Stanford University
The Mathematics of making a mess (an introduction to random walk on groups)
How many random transpositions does it take to mix up $n$ cards? This is a typical question of random walk on finite groups. The answer is $\frac{1}{2}n \log{n} + Cn$ and there is a sharp phase transition from order to chaos as $C$ varies. The techniques involve Fourier analysis on non-commutative groups (which I will try to explain for non specialists). As you change the group or change the walk, new analytic and algebraic tools are required. The subject has wide applications (people still shuffle cards, but there are applications in physics, chemistry,biology and computer science — even for random transpositions). Extending to compact or more general groups opens up many problems. This was the first problem where the ‘cutoff phenomenon’ was observed and this has become a healthy research area.
Ver também
Diaconis_notes.pdf
Projecto FCT UIDB/04459/2020.