Text: handouts
Prerequisite: None.
Course description:
This is a special non-credit three-week refresher crash course intented to teach/review basic notions and methods in classical algebra. The topics covered are needed e.g. in linear and abstract algebra. Thus it is especially advised as a supplementary course for those being interested in abstract algebra or Galois Theory, for example, but is strongly advised for everyone as the topics covered are useful in many other subjects.| As a general rule, if the sample problems below are mysterious you should consider (and are strongly advised) sitting in. More prcisely, |
Topics covered:
Week 1 — Complex Numbers
Introduction to complex numbers, algebraic and
trigonometric forms, conjugation, length and norm, operations, n-th roots of
a complex number, roots of unity, primitive roots of unity, the order of a complex number
geometric, algebraic and combinatorial applications of complex numbers
Weeks 2 and 3 — Polynomials
polynomials over fields: division algorithm,
Euclidean algorithm, greatest common divisor,
unique factorization of polynomials, polynomial functions
roots of polynomials: number of roots over fields,
Viete-formulae -- the connection between the roots and the coefficients of the polynomial,
multiple roots, formal differentiation, derivative-test,
multivariable polynomials: symmetric polynomials, elementary
symmetric polynomials, the fundamental theorem of symmetric polynomials,
Newton formulae;
polynomials over R and C: the Fundamental
Theorem of Algebra, description of the irreducibles over R and C, algebraic closure.
Polynomials over Q and Z: integer and
rational root tests, primitive polynomials, Gauss' lemma,
Schoeneman-Eisenstein criteria for irreducibility, irreducible polynomials
over the prime fields, Cyclotomic polynomials
Polynomials over Z_p: Exponentiating over Z_p, mod
prime irreducibility test for integer polynomials