Finite Groups III [Paperback]

X. Local Finite Group Theory.- ? 1. Elementary Lemmas.- ? 2. Groups of Order Divisible by at Most Two Primes.- ? 3. The J-Subgroup.- ? 4. Conjugate p-Subgroups.- ? 5. Characteristic p-Functors.- ? 6. Transfer Theorems.- ? 7. Maximal p-Factor Groups.- ? 8. Glaubermans K-Subgroups.- ? 9. Further Properties of J, ZJ and K.- ?10. The Product Theorem for J.- ?11. Fixed Point Free Automorphism Groups.- ?12. Local Methods and Cohomology.- ?13. The Generalized Fitting Subgroup.- ?14. The Generalized p?-Core.- ?15. Applications of the Generalized Fitting Subgroup.- ?16. Signalizer Functors and a Transitivity Theorem.- Notes on Chapter X.- XI. Zassenhaus Groups.- ? 1. Elementary Theory of Zassenhaus Groups.- ? 2. Sharply Triply Transitive Permutation Groups.- ? 3. The Suzuki Groups.- ? 4. Exceptional Characters.- ? 5. Characters of Zassenhaus Groups.- ? 6. Feits Theorem.- ? 7. Non-Regular Normal Subgroups of Multiply Transitive Permutation Groups.- ? 8. Real Characters.- ? 9. Zassenhaus Groups of Even Degree.- ?10. Zassenhaus Groups of Odd Degree and a Characterization of PGL(2, 2f).- ?11. The Characterization of the Suzuki Groups.- ?12. Order Formulae.- ?13. Survey of Ree Groups.- Notes on Chapter XI.- XII. Multiply Transitive Permutation Groups.- ? 1. The Mathieu Groups.- ? 2. Transitive Extensions of Groups of Suzuki Type.- ? 3. Sharply Multiply Transitive Permutation Groups.- ? 4. On the Existence of 6- and 7-Fold Transitive Permutation Groups.- ? 5. A Characterization of M11 and PSL(3, 3).- ? 6. Multiply Homogeneous Groups.- ? 7. Doubly Transitive Soluble Permutation Groups.- ? 8. A Characterization of SL(2, 5).- ? 9. Sharply Doubly Transitive Permutation Groups.- ?10. Permutation Groups of Prime Degree.- Notes on Chapter XII.- Index of Names.Springer Book Archives