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A recommended course for Information Security and specialization Mathematical Structures within General
Mathematics. This is an introductory lecture to basic algebraic geometry focused on curves. The course is
concerned with the basic notions (affine and projective variety, mappings on varieties, coordinate rings), local
properties of curves, Bezout theorem and elliptic curves.
Last update: G_M (15.05.2012)
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The credit (zápočet) will be granted with the exam.
The exam is written, containing both theoretical and computational problems, based on the topics covers by the lecture and exercise sessions.
See the course website for details. Last update: Stanovský David, doc. RNDr., Ph.D. (22.02.2022)
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W. Fulton: Algebraic Curves: an introduction to algebraic geometry, Benjamin, Reading 1969. B. Hassett: Introduction to algebraic geometry, Cambridge University Press, Cambridge 2007. J. H. Silverman and J. Tate: Rational Points on Elliptic Curves, Springer, New York 1992. I. R. Shafarevich: Basic Algebraic Geometry 1, Springer, Berlin 1994. Last update: G_M (24.04.2012)
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The topics covered by the exam correspond to the topics presented at the lecture and the exercise sessions, see http://www.karlin.mff.cuni.cz/~stanovsk/vyuka/krivky.htm Last update: Stanovský David, doc. RNDr., Ph.D. (18.02.2020)
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Algebraic geometry in affine spaces
Algebraic geometry in projective spaces
Last update: Stanovský David, doc. RNDr., Ph.D. (20.02.2018)
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Some familiarity with basics of commutative algebra, properties of polynomial rings over a field and algebraic varieties. Last update: G_M (24.04.2012)
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