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Last update: doc. Mgr. et Mgr. Jan Žemlička, Ph.D. (13.09.2013)
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Last update: doc. Mgr. et Mgr. Jan Žemlička, Ph.D. (18.02.2020)
The course is ended by a written exam followed by an oral exam based on the results of the written one. The test will consist of three questions on the presented theory and of two application tasks. Students can write one midterm test in the middle of the semester (probably on 7th April). The resulting grade is based either on the final exam or on combination of the midterm test (40%) and of the final exam (60%) depending on which option will be more advantageous for the student. |
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Last update: doc. Mgr. et Mgr. Jan Žemlička, Ph.D. (18.02.2020)
H. Stichtenoth: Algebraic function fields and codes. Graduate texts in mathematics 254, Springer, 2009
R. Hartshorne: Algebraic geometry Graduate Texts in Mathematics 52, Springer 1977
V. Salvador, G. Daniel: Topics in the theory of algebraic function fields. Birkhäuser, Boston 2006.
W. Fulton, Algebraic Curves (An Introduction to Algebraic Geometry), 2008, http://www.math.lsa.umich.edu/~wfulton/CurveBook.pdf |
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Last update: doc. Mgr. et Mgr. Jan Žemlička, Ph.D. (18.02.2020)
The course is ended by a written exam followed by an oral exam based on the results of the written one. The requirements correspond to the syllabus and the material presented during the lectures. |
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Last update: doc. Mgr. et Mgr. Jan Žemlička, Ph.D. (13.09.2013)
The course develops basic theory of algebraic function fields (Riemann-Roch Theorem etc.) and shows links to function fields of curves. The final part of the course is devoted to elliptic function fields. |
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Last update: doc. Mgr. et Mgr. Jan Žemlička, Ph.D. (17.05.2019)
Basics of commutative algebra on level of the course Commutative rings. |