July 13-17, 2026 - Queen Mary University of London (School of Mathematical Sciences)
The aim of this workshop is to explore key topics in the theory of evolution equations, both linear and nonlinear, which lie at the intersection of mathematical analysis and physics. The event is designed to foster collaboration between leading experts and early-career researchers through the study of evolution equations with smooth as well as singular coefficients. These problems will be addressed using a broad range of techniques from mathematical and geometric analysis, including microlocal analysis, harmonic analysis, and spectral theory.
Alexandre Arias Junior (University of São Paulo)
Alessia Ascanelli (University of Ferrara)
Yuri Cacchiò (University of Vienna)
Marco Cappiello (University of Turin)
Matteo Capoferri (University of Milan & Heriot-Watt University)
Elena Cordero (University of Turin)
Lucrezia Cossetti (University of the Basque Country)
Michele Coti Zelati (Imperial College London)
Manuel Del Pino (University of Bath)
Marcelo Ebert (University of São Paulo)
Serena Federico (University of Bologna)
Marina Ghisi (University of Pisa)
Gianluca Giacchi (University of Italian Switzerland)
Massimo Gobbino (University of Pisa)
Marcello Malagutti (University College London)
Monica Musso (University of Bath)
Michael Oberguggenberger (Innsbruck University)
Beatrice Pelloni (Heriot-Watt University)
Michael Ruzhansky (Ghent Analysis and PDE at Ghent University & QMUL)
Bolys Sabitbek (Ghent Analysis and PDE at Ghent University)
Davide Tramontana (University of Bologna)
Public Lecture: given by Dmitri Vassiliev (University College London) on Thursday 16th
Claudia Garetto (Queen Mary University of London), Marcello Malagutti (University College London), Davide Tramontana (Università di Bologna)
Fundings: EP/V005529/2: Hyperbolic problems with discontinuous coefficients