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09757 - Geometry and Algebra

Academic Year 2011/2012

  • Teaching Mode: Traditional lectures
  • Campus: Cesena
  • Corso: First cycle degree programme (L) in Electronics, Informatics and Telecommunications Engineering (cod. 8196)

Learning outcomes

Basic topics of matrix and vector calculus; in particular:  
computation of determinants, matrices inverses, linear systems, eigenvalues, eigenvectors and eigenspaces of matrices.

Course contents

Linear systems.
Algebraic structures. Standard operation on K^n. Linear systems.

Matrices.
Basic definitions. Matrix algebra. Linear systems and matrices.

Vector spaces.
Basic definitions. Subspaces. Linear combinations. Sum of subspaces.

Bases.
Linear dependence. Bases and dimension. Rank of matrices. Application to linear systems.

Linear transformations.
Linear transformations. Isomorphisms and endomorphisms. Imagine and Kernel of linear transformations.

Matrix representation of linear transformations.
Matrix representation of linear transformations and endomorphisms. Bases change formula.

Determinants.
Permutations. Determinants. Properties of determinants. Laplace formula. Inverse matrix. Applications to computation of rank. Applications to linear systems.

Rappresentation of subspaces.
Cartesian and parametric representation of subspaces.

Eigenvalues, eigenvectors and eigenspaces.
Eigenvalues, eigenvectors and eigenspaces of endomorphisms and matrices. Matrix similarity. Characteristic polynomial. Diagonalization of matrices.

Bilinear and quadratic forms.
Bilinear forms. Matrix representation of bilinear forms. Matrix congruence. Index. Quadratic forms. Real and complex quadratic forms. Canonical forms.

Readings/Bibliography

M.R. Casali, C. Gagliardi, L. Grasselli, "Geometria", Progetto Leonardo, Bologna, 2002
G. Parigi, A. Palestini, "Manuale di Geometria - Esercizi", ed. Pitagora, Bologna, 2003. 
L. Gualandri, "Esercizi di algebra lineare e geometria", Progetto Leonardo, Bologna, 1995. 
S. Lipschutz, M. Lipson, "Algebra lineare", Collana Schaum's, McGraw Hill.

Teaching methods

Lessons on blackboard

Assessment methods

See
http://www.dm.unibo.it/~mulazza/didattica.htm

Teaching tools

See
http://www.dm.unibo.it/~mulazza/didattica.htm

Links to further information

http://www.dm.unibo.it/~mulazza/didattica.htm

Office hours

See the website of Michele Mulazzani