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Preface
1 Basic definitions and examples
��1.1 Groups: definition and examples
��1.2 Homomorphisms: the relation between SL 2, and the Lorentz group
��1.3 The action of a group on a set
��1.4 Conjugation and conjugacy classes
��1.5 Applications to crystallography
��1.6 The topology of SU 2 and SO 3
��1.7 Morphisms
��1.8 The classification of the finite subgroups of SO 3
��1.9 The classification of the finite subgroups of O 3
��1.10 The icosahedral group and the fullerenes
2 Representation theory of finite groups
��2.1 Definitions, examples, irreducibility
��2.2 Complete reducibility
��2.3 Schur''s lemma
��2.4 Characters and their orthogonality relations
��2.5 Action on function spaces
��2.6 The regular representation
��2.7 Character tables
��2.8 The representations of the symmetric group
3 Molecular vibrations and homogeneous vector bundles
��3.1 Small oscillations and group theory
��3.2 Molecular displacements and vector bundles
��3.3 Induced representations
��3.4 Principal bundles
��3.5 Tensor products
��3.6 Representative operators and quantum mechanical selection rules
��3.7 The semiclassical theory of radiation
��3.8 Semidirect products and their representations
��3.9 Wigner''s classification of the irreducible representations of the Poincare group
��3.10 Parity
��3.11 The Mackey theorems on induced representations, with applications to the symmetric group
��3.12 Exchange forces and induced representations
4 Compact groups and Lie groups
��4.1 Haar measure
��4.2 The Peter-Weyl theorem
��4.3 The irreducible representations of SU 2
��4.4 The irreducible representations of SO 3 and spherical harmonics
��4.5 The hydrogen atom
��4.6 The periodic table
��4.7 The shell model of the nucleus
��4.8 The Clebsch-Gordan coefficients and isospin
��4.9 Relativistic wave equations
��4.10 Lie algebras
��4.11 Representations of su 2
5 The irreducible representations of SU n
��5.1 The representation of Gl V on the r-fold tensor product
��5.2 Gl V spans Hornsr TrV, TrV
��5.3 Decomposition of TrV into irreducibles
��5.4 Computational rules
��5.5 Description of tensors belonging to W
��5.6 Representations of Gl V and Sl V on U
��5.7 Weight vectors
��5.8 Determination of the irreducible finite-dimensional repre-sentations of Sl d, C
��5.9 Strangeness
��5.10 The eight-fold way
��5.11 Quarks
��5.12 Color and beyond
��5.13 Where do we stand
Appendix A The Bravais lattices and the arithmetical crystal classes
��A.1 The lattice basis and the primitive cell
��A.2 The 14 Bravais lattices
����Appendix B Tensor product
����Appendix C Integral geometry and the representations of the symmetric group
��C.1 Partition pairs
��C.2 Proof of the main combinatorial lemma
��C.3 The Littlewood-Richardson rule and Young''s rule
��C.4 The ring of virtual representations of all the Sn
��C.5 Dimension formulas
��C.6 The Murnaghan-Nakayama rule
��C.7 Characters of Gl V
����AppendixD Wigner''s theorem on quantum mechanical symmetries
����Appendix E Compact groups, Haar measure, and the Peter-Weyl theorem
����Appendix F A history of 19th century spectroscopy
����Appendix G Characters and fixed point formulas for Lie groups
Further reading
Index