10-327/Homework Assignment 7: Difference between revisions

From Drorbn
Jump to navigationJump to search
No edit summary
m (EDIT: moved Kai's HW7 solutions to new page)
 
(4 intermediate revisions by 3 users not shown)
Line 23: Line 23:


*Question. If we have a finite set of continuous function mapping from any topological space into the reals. Any linear combination of these continuous function is still continuous right? The proof is a little extension of 157 proof. This is used to prove the statement you mentioned above. -Kai[[User:Xwbdsb|Xwbdsb]] 17:14, 20 November 2010 (EST)
*Question. If we have a finite set of continuous function mapping from any topological space into the reals. Any linear combination of these continuous function is still continuous right? The proof is a little extension of 157 proof. This is used to prove the statement you mentioned above. -Kai[[User:Xwbdsb|Xwbdsb]] 17:14, 20 November 2010 (EST)
** Any linear combination of functions from <math>\mathcal{C}(X,\mathbb{R})</math> (an uncountable set unless X is empty) is continuous. On its own, however, this proves nothing about infinite sums. [[User:Bcd|Bcd]] 22:32, 21 November 2010 (EST)


*Question about 9. Is J any indexing set? Possibly uncountable? in the hint: A means any closed set? -Kai [[User:Xwbdsb|Xwbdsb]] 22:13, 20 November 2010 (EST)
*Question about 9. Is J any indexing set? Possibly uncountable? in the hint: A means any closed set? -Kai [[User:Xwbdsb|Xwbdsb]] 22:13, 20 November 2010 (EST)
** Yes, <math>J</math> is arbitrary and <math>A</math> is closed. [[User:Drorbn|Drorbn]] 06:41, 22 November 2010 (EST)

Latest revision as of 21:56, 10 December 2010

Reading

Read sections in Munkres' textbook (Topology, 2nd edition). Remember that reading math isn't like reading a novel! If you read a novel and miss a few details most likely you'll still understand the novel. But if you miss a few details in a math text, often you'll miss everything that follows. So reading math takes reading and rereading and rerereading and a lot of thought about what you've read. Also, preread sections , just to get a feel for the future.

Doing

Solve and submit the following problems from Munkres' book:

  • Problem 1 on page 199.
  • Problem 1 on page 205.
  • Problems 1, 4, 5, 8, 9 on pages 212-213.

Remark. The following fact, which we will prove later, may be used without a proof: If is a topological space and are continuous functions, then the sum is convergent and defines a continuous function on .

Due date

This assignment is due at the end of class on Thursday, November 25, 2010.

Dror's notes above / Student's notes below
  • Question: In problem 1 p205, is asks us to show that any closed subspace of a normal space is also normal. Do we really need the condition that the subspace be closed? - Jdw
    • Yes. Drorbn 19:14, 19 November 2010 (EST)

Questions by Kai Xwbdsb 21:26, 19 November 2010 (EST) were moved to Classnotes for Thursday November 18 as they are about that class and not about this assignment. Drorbn 06:03, 20 November 2010 (EST)

  • Question. If we have a finite set of continuous function mapping from any topological space into the reals. Any linear combination of these continuous function is still continuous right? The proof is a little extension of 157 proof. This is used to prove the statement you mentioned above. -KaiXwbdsb 17:14, 20 November 2010 (EST)
    • Any linear combination of functions from (an uncountable set unless X is empty) is continuous. On its own, however, this proves nothing about infinite sums. Bcd 22:32, 21 November 2010 (EST)
  • Question about 9. Is J any indexing set? Possibly uncountable? in the hint: A means any closed set? -Kai Xwbdsb 22:13, 20 November 2010 (EST)
    • Yes, is arbitrary and is closed. Drorbn 06:41, 22 November 2010 (EST)