CMC Thematic Program on
Cluster Algebras in Mathematics and Physics

Date: Oct. 28 ~ Dec. 22, 2014 / Place: KIAS, Seoul, Korea
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Within the last decade or so, the interaction of algebraic, combinatorial, geometric and topological methods has become strong and significant. Notably, the development of cluster algebras has been very active.
In particular, cluster algebras provide a unifying algebraic/ combinatorial framework for a wide variety of phenomena in diverse settings ranging from tropical calculus to number theory and from topological recursion to invariant theory. This program focuses on links between cluster algebras and other areas, such as: Total Positivity, Quiver Representations, String Theory, Statistical Physics, Noncommutative Geometry, Teichmuller Theory, Hyperbolic Geometry, Tropical Geometry, KP Solitons, Integrable Systems, Quantum Mechanics, Lie Theory, Algebraic Combinatorics and Poisson Geometry.
Scientific Committee
Sergey Fomin (University of Michigan, USA) 
Masaki Kashiwara (Kyoto University, RIMS, Japan & Seoul National University, Korea)
Piljin Yi (KIAS, Korea)
Organizing Committee
Kyungyong Lee (Wayne State University, USA & KIAS CMC, Korea)
Li Li (Oakland University, USA)
Ralf Schiffler (University of Connecticut, USA)