|
||
|
Title: Almost disjoint family Post by Aryabhatta on Jul 26th, 2004, 12:43am This is a problem from the book: "A problem Seminar" by Donald J Newman. Two sets are called almost disjoint if there intersection is finite. Let F be a family of subsets of natural numbers. What is the largest cardinality that F can have so that any two distinct members of F are almost disjoint? |
||
|
Title: Re: Almost disjoint family Post by towr on Jul 26th, 2004, 2:26am ::[hide]Can't you just take the family { { i | i < n} | n [in] [bbn] }, which has the same cardinality as [bbn] since they are equivalent. Since any set in the family is finite any intersection between them is finite.. And even the power set of [bbn] has the same cardinality, doesn't it? So you can't get any more..[/hide]:: |
||
|
Title: Re: Almost disjoint family Post by Eigenray on Jul 26th, 2004, 7:22am on 07/26/04 at 02:26:56, towr wrote:
Nooo!!!!! No set has the same cardinality as its power set: Suppose f : S [to] P(S) is a bijection. Consider f-1({ x | x [notin] f(x) }). Back to the problem: Hint1: [hide]The obvious solution has cardinality equal to N. What is a popular set that is larger?[/hide] Hint2: [hide]How is it defined?[/hide] Hint3: [hide]Cauchy sequences of rationals[/hide] Solution:[hide] Let f : N -> Q be a bijection. For each real x, let {ri} be a Cauchy sequence of rationals converging to x. Let Sx = { f-1(ri) }. [/hide] |
||
|
Title: Re: Almost disjoint family Post by beibeibee on Oct 6th, 2004, 10:51am I think the answer is 2^aleph_0. Just think about comlete binary tree of omega!!! You will find the family of sets of infinite many natural numbers, each of which is in some a branch of that tree. |
||
|
Title: Re: Almost disjoint family Post by Aryabhatta on Oct 6th, 2004, 11:45am on 10/06/04 at 10:51:36, beibeibee wrote:
Yes. your answer is right! and your solution interesting. It seems that any two paths from root must have a finite intersection, but when it comes to infinity a proof would be more convincing than just intuition. I am sure that your solution is correct (and very elegant i think), it would be more convincing if there was a proof. |
||
|
Title: Re: Almost disjoint family Post by beibeibee on Oct 12th, 2004, 4:07am on 10/06/04 at 11:45:19, Aryabhatta wrote:
Ok, let us make the intuition into proof. First, put 0 or 1 on every node in the complete binary tree, just like this: then clearly each sequence of 0’s and 1’s laying in some a branch encodes exactly a subset of N. We now can conclude that there is 2^aleph_0 branches. Next, we show that any two different branches are ‘almost disjoint’. Now put the natural numbers on the nodes, like this: You can see any two different branches, say B_1 and B_2, will meet on some natural number, say n, where each of these branches goes its own way. We then obtain B_1 cap B_2 is of cardinality less than n. |
||
|
Powered by YaBB 1 Gold - SP 1.4! Forum software copyright © 2000-2004 Yet another Bulletin Board |