Computational Invariant Theory

  • Harm Derksen
  • Gregor Kemper

Part of the Encyclopaedia of Mathematical Sciences book series (EMS)

Table of contents

  1. Front Matter
    Pages i-xxii
  2. Harm Derksen, Gregor Kemper
    Pages 1-30
  3. Harm Derksen, Gregor Kemper
    Pages 31-70
  4. Harm Derksen, Gregor Kemper
    Pages 71-152
  5. Harm Derksen, Gregor Kemper
    Pages 153-264
  6. Harm Derksen, Gregor Kemper
    Pages 265-296
  7. Back Matter
    Pages 297-366

About this book


This book is about the computational aspects of invariant theory. Of central interest is the question how the  invariant ring of a given group action can be calculated. Algorithms for this purpose form the main pillars around which the book is built. There are two introductory chapters, one on Gröbner basis methods and one on the basic concepts of invariant theory, which prepare the ground for the algorithms. Then algorithms for computing invariants of finite and reductive groups are discussed. Particular emphasis lies on interrelations between structural properties of invariant rings and computational methods. Finally, the book contains a chapter on applications of invariant theory, covering fields as disparate as graph theory, coding theory, dynamical systems, and computer vision.

The book is intended for postgraduate students as well as researchers in geometry, computer algebra, and, of course, invariant theory. The text is enriched with numerous explicit examples which illustrate the theory and should be of more than passing interest.

More than ten years after the first publication of the book, the second edition now provides a major update and covers many recent developments in the field. Among the roughly 100 added pages there are two appendices, authored by Vladimir Popov, and an addendum by Norbert A'Campo and Vladimir Popov.   


Gröbner basis algorithms coding theory computational commutative algebra geometry invariant theory

Authors and affiliations

  • Harm Derksen
    • 1
  • Gregor Kemper
    • 2
  1. 1.University of Michigan, Department of MathematicsAnn ArborUSA
  2. 2.Technische Universität München, Zentrum Mathematik - M11GarchingGermany

Bibliographic information