- Docente: Mirella Manaresi
- Credits: 6
- SSD: MAT/03
- Language: Italian
- Moduli: Mirella Manaresi (Modulo 1) Francesca Cagliari (Modulo 2)
- Teaching Mode: Traditional lectures (Modulo 1) Traditional lectures (Modulo 2)
- Campus: Bologna
- Corso: Second cycle degree programme (LM) in Mathematics (cod. 8208)
Learning outcomes
The student is supposed to acquire some advanced knowledge in
algebra and geometry and to be able to apply them
to problems .
Course contents
Module I (24 hours, Mirella Manaresi)
Polynomials in one variable with coefficients in a field, resultant
of two polynomials.
Polynomials in several variables with coefficients in a field and
their properties. Monomial orders. Groebner basis of an ideal of
the polynomial ring and Buchberger algorithm.
Systems of polinomial equations and elimination theory. Resultants
and elimination ideals.
Application of Groebner basis and elimination theory to the study
of singular points of curves and surfaces, impliticization
problems, interpolations problems, cinematic problems of
robotics.
Module II (24 hours, Francesca Cagliari):
1. Classification of compact surfaces (14 hours):
Compact surfaces with and without boundary. Fundamental group and
van Kampen's theorem. Euler characteristic for a triangulated
manifold.
Classification of compact surfaces with and without boundary.
2. Curves and surfaces (10 hours):
Planar Curves: Cycloid, Epicycloid and hypocycloid, Lemniscate,
Cardioid, Catenary, Cissoid. Examples.
S pace curves: cylindrical helix, helicoid, asteroid.
Parametric surfaces in R³. Study of some remarkable surfaces, such
as, for example: the ball, the ellipsoid, the torus, the paraboloid
and the hyperboloid.
The two modules will be in parallel. Some topics of one module will
be used in the other one.
Readings/Bibliography
For Module I:
D.Cox - J.Little - D.O'Shea: Ideals, Varieties and Algorithms. 3rd
Ed. Undergraduate Texts in Mathematics. Springer Verlag, New
York 2007
For Module II:
L.Christine Kinsey: Topology of Surfaces . Springer Verlag
R. Caddeo, A. Gray: Lezioni di geometria differenziale. Curve e
Superfici. vol. 1 Cooperativa Universitaria Editrice Cagliaritana
(2001)
Teaching methods
Lectures and laboratory exercise sessions. Sheets of exercises
will be handed out during the lectures (see http://www.dm.unibo.it/~manaresi/ and
http://www.dm.unibo.it/~cagliari/)
, in addition to the ones available in the suggested
textbooks.
During laboratory sessions some of these exercises will be discussed, some others must be prepared by students before the exam.
In the office hours students will be coached individually.
Assessment methods
Oral exam, starting from the discussion of the exercises that
students must solve and give to the teachers at least a week before
the exam. For the solution of exercises of Module I students need
to use COCOA or Singular or some other software for symbolic
computation available in the Laboratories.
The date of the exam must be fixed with the teachers of the
course.
Teaching tools
Lectures and laboratory exercise sessions. Sheets of exercises will be handed out during the lectures (see http://www.dm.unibo.it/~manaresi/ and http://www.dm.unibo.it/~cagliari/) , in addition to the ones available in the suggested textbooks. In the office hours students will be coached individually.
For Module one will be used the free software COCOA (see ftp://cocoa.dima.unige.it/cocoa) and Singular (see http://www.singular.uni-kl.de/).
In the students Laboratories of the Department of Mathematics students can be use also Macaulay, Maple, Reduce, Mathematica.
In the office hours students will be coached individually.
Links to further information
http://www.dm.unibo.it/~manaresi/
Office hours
See the website of Mirella Manaresi
See the website of Francesca Cagliari