The conference topic is the effective use of the function theory on Riemann surfaces and their families in various applications.

Riemann surface theory today is at the intersection of several mathematical disciplines: complex analysis, topology, geometry (algebraic, complex and hyperbolic) and number theory.

Despite its venerable age, this subject field continues to develop rapidly, which can be explained by its numerous applications. These applications arise in the most unexpected places, including mathematics itself, classical mechanics, theoretical physics, engineering, cryptography. Our goal is to bring together experts in the theory of Riemann surfaces and the theory of moduli spaces with specialists in scientific computing. The exchange of knowledge should inform analysts about the capabilities of modern computing and computational mathematicians about current problems in the theory of Riemann surfaces that are accessible for experimental study.

Organizers
Bogatyrev Andrei Borisovich
Grinevich Petr Georgievich

Institutions
Marchuk Institute of Numerical Mathematics of the Russian Academy of Sciences, Moscow