Fr�ohlich, A. 1916-
Central extensions, Galois groups, and ideal class groups of number fields / [electronic resource] A. Fr�ohlich. - Providence, R.I. : American Mathematical Society, c1983. - 1 online resource (viii, 86 p.) - Contemporary mathematics, v. 24 0271-4132 (print); 1098-3627 (online); . - Contemporary mathematics (American Mathematical Society) ; v. 24. .
Bibliography: p. 85-86.
1. Background from Class Field Theory 2. The Genus Field and the Genus Group 3. Central Extensions 4. Maximal Quasicentral Extensions, Maximal $\ell $-Extensions and Maximal Class Two Extensions 5. More on Class Groups 6. Some Remarks on History and Literature Literature
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9780821876091 (online)
Class field theory.
Field extensions (Mathematics)
Galois theory.
Class groups (Mathematics)
QA247 / .F758 1983
512/.3
Central extensions, Galois groups, and ideal class groups of number fields / [electronic resource] A. Fr�ohlich. - Providence, R.I. : American Mathematical Society, c1983. - 1 online resource (viii, 86 p.) - Contemporary mathematics, v. 24 0271-4132 (print); 1098-3627 (online); . - Contemporary mathematics (American Mathematical Society) ; v. 24. .
Bibliography: p. 85-86.
1. Background from Class Field Theory 2. The Genus Field and the Genus Group 3. Central Extensions 4. Maximal Quasicentral Extensions, Maximal $\ell $-Extensions and Maximal Class Two Extensions 5. More on Class Groups 6. Some Remarks on History and Literature Literature
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9780821876091 (online)
Class field theory.
Field extensions (Mathematics)
Galois theory.
Class groups (Mathematics)
QA247 / .F758 1983
512/.3