The Ubiquitous Young Tableau [single cha
β Bruce E. Sagan
π Library
π
2003
π English
β¦ LIBER β¦
π
Invariant Theory and Tableaux
β Scribed by Dennis Stanton (eds)
- Publisher
- Springer
- Year
- 1988
- Tongue
- English
- Leaves
- 310
- Series
- The IMA Volumes in Mathematics and Its Applications #19
- Category
- Library
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β¦ Table of Contents
Front cover
Title
Contents
Foreword
Preface
Introduction to invariant theory in superalgebras (Rota, Sturmfels)
Implementation of the straightening algorithm of classical invariant theory (White)
Canonical forms of binary forms: variations on a theme of Sylvester (Kung)
Invariant theory, equivalence problems, and the calculus of variations (Olver)
A survey of invariant theory applied to normal forms of vectorfields with nilpotent linear part (Cushman, Sanders)
Operators commuting with Coxeter group actions on polynomials (Dunkl)
The MΓΆbius function of subword order (BjΓΆrner)
Keys & standard bases (Lascoux, SchΓΌtzenberger)
Variations on differential posets (Stanley)
Idempotents for the free Lie algebra and q-enumeration (Bergeron, Bergeron, Garsia)
Tableaux in the representation theory of the classical Lie groups (Sundaram)
S-functions and characters of Lie algebras and superalgebras (King)
The ubiquitous Young tableau (Sagan)
π SIMILAR VOLUMES
Young Tableaux in Combinatorics, Invaria
β Joseph Kung
π Library
π
1982
π Academic Press
π English
Young Tableaux in Combinatorics, Invariant Theory, and Algebra: An Anthology of Recent Work is an anthology of papers on Young tableaux and their applications in combinatorics, invariant theory, and algebra. Topics covered include reverse plane partitions and tableau hook numbers; some partitions as
Invariant theory and superalgebras
β Frank D. Grosshans, Gian-Carlo Rota, Joel A. Stein
π Library
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1987
π AMS
π English
Invariant theory and superalgebras
β Frank D. Grosshans, Gian-Carlo Rota, Joel A. Stein
π Library
π
1987
π AMS
Invariant Theory Old and New
β Jean Dieudonne, J.B. Carrell
π Library
π
1971
π English
Reflection Groups and Invariant Theory
β Richard Kane (auth.), Jonathan Borwein, Peter Borwein (eds.)
π Library
π
2001
π Springer-Verlag New York
π English
<p>Reflection Groups and their invariant theory provide the main themes of this book and the first two parts focus on these topics. The first 13 chapters deal with reflection groups (Coxeter groups and Weyl groups) in Euclidean Space while the next thirteen chapters study the invariant theory of pse