R E A L    A N A L Y S I S:   M a t h  8 6 0 2,  Spring  2 0 0 4

 Last Changed     May 10a, 2004

This is the main page for Math 8602; links to any other pages associated with Math 8602 will be here.

The course meets at 12:20pm MWF, in Vincent Hall 364.
Instructor: Max Jodeit ("Yodite") VinH 258, 5-3855, jodeit@math.umn.edu
Office hours: 1:30 - 2:20 MWF, or by appointment. Or call 5-3855 to see if I'm available.

News and Announcements

NEWS May 10a: A note on Riesz Representation+ (C_c(X)) is up.
Mr Lee has put comments about Assignment 11
on the Web. Use the link under April 22.

NEWS May 4: A note on the sets V_r in Urysohn's Lemma;
The Final Exam will be Wednesday May 12 in VinH 20.

NEWS Apr 28: Assignments updated.
Our study of the Riesz Representations Theorems
will be based on Rudin's Real and Complex Analysis,
pp 36-49, 130-133 as well as parts of W&Z, Chapter 11 and on
what you already know, going all the back to Chapter 3...

NEWS Apr 22:

    Mr Lee's comments on HW 9.  4/22


NEWS Apr 21: Assignments updated.
A solution of FP #3 has been posted.

NEWS Apr 14: Assignments updated.

NEWS Apr 7: Version 3 of IP & Hilbert is posted.

Test 2: average 70.3, median 71.
pseudo-top 100
A 76
B 61
C 46
D 36

NEWS Apr 6: Assignments updated.

NEWS Apr 1: More questions about Test 2.

NEWS Mar 28: A solution of the "finite dimension closed"
question is posted. A "Questions" section for Test 2 appears below.
TEST 2 will be in VinH 20 again. Some of the material on this page has moved to "Old News."

NEWS Mar 24: Assignments updated.

Anent Test 2, Apr 2, in VinH 20:
Why are Ch 6 HW questions covered on Test 2?
Only those not already covered, and having some relation
to later material will be considered for Test 2.
What do we have to know about the Examples on pp 151-2?
Just be able to use them as examples, if you need them, to deal
with matters related to the first part of Ch 9, thru (9.7).
What material will be covered on Test 2?
A neighborhood of:
HW, including from Chap 6;
Ch 7, section 5;
Ch 8, including the IP & Hilbert Space notes;
Ch 9, thru (9.7) and the examples on pp 151-2.

Old News.  3/28




The links below are to PDF documents, which require Adobe Acrobat Reader.

Math 8602     Assignments, 4/28;    Syllabus, 12/29.

    3 steps in Riesz Rep+  5/10

    The sets V_r in Urysohn's Lemma.  5/4

    A solution of Further Problem 3.  4/21

    The finite-dimension question.  3/28

    Inner product and Hilbert Spaces, 2004 v3.  4/7

    The Recursion Theorem: proof & example.  11/23

Follow this link to download the latest Acrobat Reader from Adobe at no charge. "Express" URL

If you have questions, please call Prof. Max Jodeit at 625-3855, or send e-mail to: jodeit@math.umn.edu.

When I answer your questions by email, I'll use (almost) TeX notation to send math symbols. You can look at the page on
reading my "math by e-mail"   to help translate (and start learning TeX too!).

 

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