Product Description
In this book, the author convinces that Sir Arthur Stanley Eddington had things a little bit wrong, as least as far as physics is concerned. He explores the theory of groups and Lie algebras and their representations to use group representations as labor-saving tools.
Table of Contents
WHy Group Theory?
1 Finite Groups
2 Lie Groups
3 SU(2)
4 Tentor OPerators
5 Isopin
6 Roots and Weights
7 SU(3)
8 Simple Roots
9 More SU(3)
10 Tentor Methods
11 Hypercharge and Strangeness
12 Young Tableaux
13 SU(N)
14 3-D Harmonic Oscillator
15 SU(6) and Quark Model
16 Color
17 Constituent Quarks
18 UNifiec THeories and SU(5)
19 THe Classical Groups
20 The Classification Theorem
21 SO(2n+1) and Spinors
22 SO(2n+2) Spinors
23 SU(3)&SO(2n)
24 SO(10)
25 Automorphisms
26 Sp(2n)
27 Odds and Ends
Epilogue
Index.
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