The course covers introductory topics of linear algebra. They include matrices, matrix operations, inversion of matrices, vector spaces, bases and dimension and their applications to solving systems of linear equations. Vector spaces are presented over real numbers and GF(2). Eigenvalues and eigenvectors of matrices.

To be specified in seminars by tutors.

1. Vector spaces, axioms of linearity.

2. Linear independence, linear dependence, linear span.

3. Basis, dimension, coordinates of vectors.

4. Matrices, operations with matrices.

5. Determinants.

6. Inverse matrices.

7. Systems of linear equations.

8. Linear mappings, matrices of linear mappings.

9. Eigenvalues and eigenvectors of matrices.

10. Scalar product, orthogonality.

11. Arithmetic vectors over GF(2), solution of linear equations over FG(2).

12. Applications in linear coding.

13. Back-up class.

1. Polynomials, roots of polynomials.

2. Gaussian elimination, rank of matrices.

3. Vector spaces, linear independence, linear dependence.

4. Basis, dimension, coordinates of vectors.

5. Matrices, operations with matrices.

6. Determinants.

7. Systems of linear equations.

8. Linear mappings, matrices of linear mappings.

9. Eigenvalues and eigenvectors of matrices.

10. Scalar product, orthogonality.

11. Arithmetic vectors over GF(2), solution of linear equations over FG(2).

12. Applications in linear coding.

13. Back-up class.

1. P. Pták: Introduction to Linear Algebra. ČVUT, Praha, 2005.

2. P. Pták: Introduction to Linear Algebra, starší vydání přístupné elektronicky.