Always subject to revision ...
MA 5524 Syllabus
Spring '12, T. Olson
Instructor:
Tamara Olson
(trolson@mtu.edu)
208 Fisher Hall
487 - 2191
Office Hours:
by appointment and (Tu/Th 10am-noon, F 2-3pm)
Reading guides
Homework assignments
- HW8 (due M 4/16)
4.12 (Example of bounded linear operator from a
normed linear space onto a normed linear space which is
not an open mapping (with proof).)
4.13 # 6, 11
(7.2 # 1)
7.3 # 2, 4
- HW7 (due M 4/2)
4.9 # 4
4.8 # 4
4.7 # 9, 10
4.6 # 2
- HW6 (due W 3/19)
4.5 # 8
4.3 # 9
4.2 # 6
4.1 # 4, 6
3.5 # 5
- HW5 (due W 2/22)
3.1 # 11, 15
3.2 # 8
3.3 # 7
3.4 # (6 optional) 10
- HW4 (due M 2/13)
2.6 # 3, 4, 6
2.7 # 5, 8
2.9 # 10
2.10 # 6, 8
- HW3 (due W 2/1)
2.2 # 11, 12
2.3 # 3, 7
2.4 # 1
2.5 # 2, 9
- HW2 (due W 1/25)
1.4 # 2, 8
1.5 # 6
1.6 # 4,14
2.1 # 6
- HW1 (due W 1/18)
1.1 # 2, 12
1.2 # 4, 6, 12
1.3 # 10, 12
Resubmissions:
If you receive a grade of "R", you must resubmit your work to receive a grade.
If you receive any grade other than "A", you may rework the indicated problems
for a higher grade.
Please rewrite the whole problem/proof. Attach your old (graded) assignment
to the new submission with a paper clip. Try to complete the rewrite for
homework HW(n) before the due date for homework HW(n+2).
Text:
Kreyszig, Introductory Functional Analysis with Applications
Material in chapters 1-4, 7, 9, 10.
Assessment:
Homework, a midterm exam, and a final exam.
Homework: 40%
Mid-term Exam: 30%
Final Exam: 30%
Proof-writing help