Office: 204 Lockett Hall
MATH 7380-1 - Spring 2017
Course webpage : www.math.lsu.edu/~pcnguyen.
Please check the course webpage regularly for updated information.
Textbook: Classical Fourier Analysis (Third Edition),
2014, by Loukas Grafakos. An electronic version of the book can be
found in LSU library resource at:
Other suggested references:
1. E. M. Stein, Singular Integrals and Differentiability Properties of Functions, Princeton Univ. Press, Princeton, 1970.
2. Javier Duoandikoetxea, Fourier Analysis, Graduate Studies in Math.,
Vol. 29. Translated and revised by David Cruz-Uribe, SFO, 2000.
Course Description: This is an introductory course to Fourier Analysis
whose emphasis is placed on the boundedness of Singular Integral Operators
of convolution type. Such a boundedness property plays a fundamental role in
various applications in pure and applied analysis. The course also covers such
classical topics as Interpolation, Maximal Functions, Fourier Series, and possibly
Littlewood-Paley Theory if time permits.
Prerequisite : MATH 7311 and MATH 7350.
Time: MWF 2:30-3:20pm.
Place: 136 Lockett Hall.
MWF 1:30-2:30pm, or by appointments. Location:
204 Lockett Hall.
Assigments: There will be several homework assignments and/or presentations along the course to determine your grades.
Grades: 90-93.9% =A-, 94-97.9% =A, 98-100% =A+, 80-82.9% =B-, 83-86.9% =B, 87-89.9% =B+, 70-72.9%=C-, 73-76.9%=C, 77-79.9%=C+, 60-62.9%=D-, 63-66.9%=D, 67-69.9%=D+, and 59.9% or less=F.
Final date for dropping courses without receiving a grade of "W": Friday, Jan. 19, 2018.
date for adding courses for credit and making section changes: Monday, Jan. 22, 2018.
Final date for resigning from the University and/or dropping courses: Friday, March 23, 2018.
grades due: March 13, 9:00 a.m.
Gras holidays: February 12, 13, 14 (morning).
break: March 25- April 01.
examinations: April 30- May 05, and final grades
(degree candidate) due: May 08, 9:00am.
Students with disabilities: If
you have a disability that may have some impact on your work in this class and
for which you may require accommodations, please see a staff member in the
Office of Disability Services (112 Johnston Hall) so that such accommodations
can be considered. Students that receive accommodation letters, please meet
with me to discuss the provisions of those accommodations as soon as
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