Add to ORKGCluster integrable systems are a broad class of integrable systems modelled on bipartite dimer models on the torus. Many discrete integrable dynamics arise by applying sequences of local transformations, which form the cluster modular group of the cluster integrable system. This cluster modular group was recently characterized by the first author and Inchiostro. There exist some discrete integrable dynamics that make use of non-local transformations associated with geometric \(R\)-matrices. In this article we characterize the generalized cluster modular group - which includes both local and non-local transformations - in terms of extended affine symmetric groups. We also describe the action of the generalized cluster modular group on the sp...
The role of discrete (or point-group) symmetries is discussed in the framework of the cluster shell ...
Group based moving frames have a wide range of applications, from the classical equiva-lence problem...
The dissertation is devoted to the applications of the Noncommutative Geometry Program to the study ...
Cluster integrable systems are a broad class of integrable systems modelled on bipartite dimer model...
International audienceCluster integrable systems are a broad class of integrable systems modelled on...
We present a series of results at the interface of cluster algebras and integrable systems, discussi...
This dissertation presents connections between cluster algebras and discrete integrable systems, esp...
Cross-ratio dynamics, allowing to construct 2D discrete conformal maps from 1D initial data, is a we...
Cross-ratio dynamics, allowing to construct 2D discrete conformal maps from 1D initial data, is a we...
We introduce twisted triple crossing diagram maps, collections of points in projective space associa...
The pentagram map was introduced by R. Schwartz more than 20 years ago. In 2009, V. Ovsienko, R. Sch...
Abstract: We initiate the study of how to extend the correspondence between dimer models and (0+1)-d...
Cluster algebras are a class of commutative algebras whose generators are defined by a recursive pro...
We present two types of systems of differential equations that can be derived from a set of discrete...
There is a particular analogy between combinatorial aspects of cluster algebras and Kac-Moody algebr...
The role of discrete (or point-group) symmetries is discussed in the framework of the cluster shell ...
Group based moving frames have a wide range of applications, from the classical equiva-lence problem...
The dissertation is devoted to the applications of the Noncommutative Geometry Program to the study ...
Cluster integrable systems are a broad class of integrable systems modelled on bipartite dimer model...
International audienceCluster integrable systems are a broad class of integrable systems modelled on...
We present a series of results at the interface of cluster algebras and integrable systems, discussi...
This dissertation presents connections between cluster algebras and discrete integrable systems, esp...
Cross-ratio dynamics, allowing to construct 2D discrete conformal maps from 1D initial data, is a we...
Cross-ratio dynamics, allowing to construct 2D discrete conformal maps from 1D initial data, is a we...
We introduce twisted triple crossing diagram maps, collections of points in projective space associa...
The pentagram map was introduced by R. Schwartz more than 20 years ago. In 2009, V. Ovsienko, R. Sch...
Abstract: We initiate the study of how to extend the correspondence between dimer models and (0+1)-d...
Cluster algebras are a class of commutative algebras whose generators are defined by a recursive pro...
We present two types of systems of differential equations that can be derived from a set of discrete...
There is a particular analogy between combinatorial aspects of cluster algebras and Kac-Moody algebr...
The role of discrete (or point-group) symmetries is discussed in the framework of the cluster shell ...
Group based moving frames have a wide range of applications, from the classical equiva-lence problem...
The dissertation is devoted to the applications of the Noncommutative Geometry Program to the study ...