|
|
|
||
Last update: T_KA (16.05.2012)
|
|
||
Last update: doc. Mgr. Vítězslav Kala, Ph.D. (21.02.2020)
Oral exam |
|
||
Last update: G_M (27.04.2012)
E.I. Borevič, I.R. Šafarevič: Number Theory, Academic Press 1966; H. Cohen: A course in computational algebraic number theory, Springer-Verlag, Berlin 1996. A. Frőhlich, M.J. Taylor, Algebraic number theory, Cambridge University Press, Cambridge 1991. R.I.Harold, M. Edwards: Higher arithmetic: an algorithmic introduction to number theory, AMSociety, Providence 2008. H. Matsumura, Commutative Ring Theory, W. A. Benjamin, 1970. V. Shoup: A computational introduction to number theory and algebra, Cambridge University Press, Cambridge 2009. |
|
||
Last update: doc. Mgr. Vítězslav Kala, Ph.D. (21.02.2020)
Students have to pass final oral exam. The requirements for the exam correspond to what has been done during lectures. |
|
||
Last update: doc. Mgr. et Mgr. Jan Žemlička, Ph.D. (26.09.2012)
1. Fractional ideals of Dedekind domains, absolute norm of ideals, the finiteness of class groups. 2. Lattices. Blichfeldt's lemma. 3. Units of rings of algebraic integers, Dirichlet's Unit Theorem. 4. Quadratic and cubic fields, selected Diophantine equations.
|