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Cluster Algebras and Poisson Geometry
 
Michael Gekhtman University of Notre Dame, Notre Dame, IN
Michael Shapiro Michigan State University, East Lansing, MI
Alek Vainshtein University of Haifa, Haifa, Mount Carmel, Israel
Cluster Algebras and Poisson Geometry
eBook ISBN:  978-1-4704-1394-1
Product Code:  SURV/167.E
List Price: $125.00
MAA Member Price: $112.50
AMS Member Price: $100.00
Cluster Algebras and Poisson Geometry
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Cluster Algebras and Poisson Geometry
Michael Gekhtman University of Notre Dame, Notre Dame, IN
Michael Shapiro Michigan State University, East Lansing, MI
Alek Vainshtein University of Haifa, Haifa, Mount Carmel, Israel
eBook ISBN:  978-1-4704-1394-1
Product Code:  SURV/167.E
List Price: $125.00
MAA Member Price: $112.50
AMS Member Price: $100.00
  • Book Details
     
     
    Mathematical Surveys and Monographs
    Volume: 1672010; 246 pp
    MSC: Primary 13; 53; Secondary 05; 14; 16

    Cluster algebras, introduced by Fomin and Zelevinsky in 2001, are commutative rings with unit and no zero divisors equipped with a distinguished family of generators (cluster variables) grouped in overlapping subsets (clusters) of the same cardinality (the rank of the cluster algebra) connected by exchange relations. Examples of cluster algebras include coordinate rings of many algebraic varieties that play a prominent role in representation theory, invariant theory, the study of total positivity, etc. The theory of cluster algebras has witnessed a spectacular growth, first and foremost due to the many links to a wide range of subjects including representation theory, discrete dynamical systems, Teichmüller theory, and commutative and non-commutative algebraic geometry.

    This book is the first devoted to cluster algebras. After presenting the necessary introductory material about Poisson geometry and Schubert varieties in the first two chapters, the authors introduce cluster algebras and prove their main properties in Chapter 3. This chapter can be viewed as a primer on the theory of cluster algebras. In the remaining chapters, the emphasis is made on geometric aspects of the cluster algebra theory, in particular on its relations to Poisson geometry and to the theory of integrable systems.

    Readership

    Research mathematicians interested in cluster algebras and applications to geometry.

  • Table of Contents
     
     
    • Chapters
    • 1. Preliminaries
    • 2. Basic examples: Rings of functions on Schubert varieties
    • 3. Cluster algebras
    • 4. Poisson structures compatible with the cluster algebra structure
    • 5. The cluster manifold
    • 6. Pre-symplectic structures compatible with the cluster algebra structure
    • 7. On the properties of the exchange graph
    • 8. Perfect planar networks in a disk and Grassmannians
    • 9. Perfect planar networks in an annulus and rational loops in Grassmannians
    • 10. Generalized Bäcklund-Darboux transforms for Coxeter-Toda flows from a cluster algebra perspective
  • Reviews
     
     
    • [This book is] a rather complete, self-contained and concise introduction to the connections between cluster algebras and Poisson geometry...a good reference for researchers on the topic...It is also suitable for graduate students since it starts "from scratch"...One should also point out the successful pedagogical efforts that were made in order to render this book very clear and pleasant to read. ...The book is divided into ten chapters, ordered in an increasing level of difficulty, each of them starting with a clear introduction and ending with a summary and some bibliographical notes for further study.

      Gregoire Dupont, Mathematical Reviews
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
Volume: 1672010; 246 pp
MSC: Primary 13; 53; Secondary 05; 14; 16

Cluster algebras, introduced by Fomin and Zelevinsky in 2001, are commutative rings with unit and no zero divisors equipped with a distinguished family of generators (cluster variables) grouped in overlapping subsets (clusters) of the same cardinality (the rank of the cluster algebra) connected by exchange relations. Examples of cluster algebras include coordinate rings of many algebraic varieties that play a prominent role in representation theory, invariant theory, the study of total positivity, etc. The theory of cluster algebras has witnessed a spectacular growth, first and foremost due to the many links to a wide range of subjects including representation theory, discrete dynamical systems, Teichmüller theory, and commutative and non-commutative algebraic geometry.

This book is the first devoted to cluster algebras. After presenting the necessary introductory material about Poisson geometry and Schubert varieties in the first two chapters, the authors introduce cluster algebras and prove their main properties in Chapter 3. This chapter can be viewed as a primer on the theory of cluster algebras. In the remaining chapters, the emphasis is made on geometric aspects of the cluster algebra theory, in particular on its relations to Poisson geometry and to the theory of integrable systems.

Readership

Research mathematicians interested in cluster algebras and applications to geometry.

  • Chapters
  • 1. Preliminaries
  • 2. Basic examples: Rings of functions on Schubert varieties
  • 3. Cluster algebras
  • 4. Poisson structures compatible with the cluster algebra structure
  • 5. The cluster manifold
  • 6. Pre-symplectic structures compatible with the cluster algebra structure
  • 7. On the properties of the exchange graph
  • 8. Perfect planar networks in a disk and Grassmannians
  • 9. Perfect planar networks in an annulus and rational loops in Grassmannians
  • 10. Generalized Bäcklund-Darboux transforms for Coxeter-Toda flows from a cluster algebra perspective
  • [This book is] a rather complete, self-contained and concise introduction to the connections between cluster algebras and Poisson geometry...a good reference for researchers on the topic...It is also suitable for graduate students since it starts "from scratch"...One should also point out the successful pedagogical efforts that were made in order to render this book very clear and pleasant to read. ...The book is divided into ten chapters, ordered in an increasing level of difficulty, each of them starting with a clear introduction and ending with a summary and some bibliographical notes for further study.

    Gregoire Dupont, Mathematical Reviews
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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