The purpose of this workshop is to bring together experts and young scientists, who develop or use tools offered by the theory of combinatorial limits, to exchange ideas related to the dense and sparse settings with hopes of designing new methods for problems both inside and outside combinatorics.
The subject of the workshop will be centered around the following question: Suppose G is a fundamental group of a Riemannian manifold M. How can we use the geometry of M to study the flexible stability of G?
The workshop focuses on discrete structures and their limits. This is an active area of research that connects discrete mathematics with ergodic theory, stochastic processes, spectral theory, measured group theory and various branches of analysis and topology.
The aim of this focused workshop is to bring together some of the experts that work on dynamic percolation models of self-organized criticality. The time evolution of these random graphs are shaped by two competing mechanisms of opposite effect: addition of edges and deletion of large connected components.
The goal of the workshop is to bring together experts from both quantum information and discrete mathematics in order to discuss the state of the art, to share ideas and to identify and tackle relevant questions.
The purpose of this workshop is to bring together experts and young scientists who will form WORKING GROUPS to SOLVE DIFFERENT PROBLEMS about RANDOM GRAPHS and RELATED MATHEMATICAL TOPICS IN A VERY BROAD SENSE.