Beijing Institute of Mathematical Sciences and Applications

The topic of this workshop is recent advances in dynamical systems and their applications across various fields. Dynamical systems, which study the evolution of systems that change over time, is a vibrant area of current mathematical research. The modern theory of dynamical systems traces its origins to Poincaré’s work on celestial mechanics in the late 19th century, further developed by mathematicians including Lyapunov, Birkhoff and Smale. This field is closely connected to other areas like number theory, differential geometry and probability theory, and boasts a multitude of exciting applications in biology, chemistry, physics, engineering, climate science, social science, industrial mathematics, data science and more.

This workshop is to gather experts in dynamical systems and ergodic theory to share their latest research findings and discuss cutting-edge problems. Talks will include differentiable and stochastic dynamical systems, smooth ergodic theory and other related fields with applications in applied mathematics.