30.04.2025, 12:00
– Campus Golm, Building 9, Room 2.22 and via Zoom
Arbeitsgruppenseminar Analysis
Towards random noncommutative geometry
Carlos Perez-Sanchez (Heidelberg)
Sergei Fedotov, University of Manchester
The talk will be concerned with time-fractional master equations with random transition probabilities describing a heterogeneous population of random walkers. This formulation leads to an effective underlying random walk that demonstrates ensemble self-reinforcement. The heterogeneity of the population gives rise to an underlying random walk with strong memory for which transition probabilities increase with the number of preceding steps (self-reinforcement). We discuss the implication of ensemble self-reinforcement on the first passage time statistics and anomalous exponents.