Math 321 - Real Variables II - Spring 2012
Instructor: Malabika Pramanik
Office: 214 Mathematics Building
E-mail: malabika at math dot ubc dot ca
Lectures: Mon,Wed,Fri 9:00 AM to 10:00 AM in Room 104 Mathematics Building.
Office hours: Mon 10-11 am, Wed 11 am-12 noon or by appointment.
Course information
Week-by-week course outline
Here is a rough guideline of the course structure, arranged by week. The textbook pages are mentioned as a reference and as a reading guide; in most cases, the treatment of these topics in lecture will vary somewhat from that of the text.
- Week 1 (pages 143-146 of the textbook):
- Pointwise and uniform convergence
- Definitions and examples.
- Week 2 (pages 149-154 of the textbook):
- Interchanging limits
- Some applications
- Week 3 (pages 147-148 of the textbook):
- The space of bounded functions
- Weierstrass M-test
- The Weierstrass approximation theorem
- Week 4 (pages 159-161 of the textbook):
- Bernstein's proof of Weierstrass approximation theorem
- Approximation of continuous periodic functions by trigonometric polynomials
- Week 5 (pages 154-158 of the textbook):
- Equicontinuity
- Arzela-Ascoli theorem
- Week 6 (pages 161-165 of the textbook):
- Algebras and lattices
- The Stone-Weierstrass theorem
- Week 7 :
- Week 8 :
- Week 9 (see the textbooks in real analysis by T. Hildebrandt, or N. Carothers) :
- Towards Riemann-Stieltjes integral
- Functions of bounded variation
- Jordan's theorem
- Week 10 (pages 120-130 of the textbook):
- The Riemann-Stieltjes integral
- Riemann's condition for Riemann-Stiletjes integrability
- An integral formula for total variation
- Week 11 :
- The space of Riemann-Stieltjes integrable functions
- Closure under uniform convergence
- General integrators
- Week 12:
- Integration by parts
- Integrators of bounded variation
- Riesz representation theorem
- Week 13:
- Fourier series
- L^2 convergence of Fourier series
- Bessel's inequality
- Plancherel's theorem
Homework
Midterm
Last modified: Sun Sept 11 2011