21. Math Is Fun Forum / Pi 5 posts 4 authors - Last post Oct 11, 2006http//en.wikipedia.org/wiki/continuum_hypothesis While the truth value of the continuum hypothesis has yet to be ascertained, http://www.mathisfunforum.com/viewtopic.php?pid=45385

22. ARMENIANS - Web FreeBooknotes.com continuum_hypothesis from Wikipedia Establishing the truth or falsehood of the continuum hypothesis is . http://www.armenians.net/mobile/search/web?search=cardinality of the continuum&a

23. RARA-AVIS Archives: RARA-AVIS: Willeford's PICK-UP And WILD WIV Jul 14, 2003 The Continuum Hypothesis is an important thing in set theory and basic math, 1 http//www.wikipedia.org/wiki/continuum_hypothesis http://www.miskatonic.org/rara-avis/archives/200307/0117.html

RARA-AVIS: Willeford's PICK-UP and WILD WIVES From: William Denton ( buff@pobox.com Date: 14 Jul 2003 Next message: William Denton: "RARA-AVIS: Themes of the Months" Previous message: Doug Hoffman, MD: "RARA-AVIS: Re: Hardboiled Faulkner" Next in thread: Etienne Borgers: "Re: RARA-AVIS: Willeford's PICK-UP and WILD WIVES" Reply: Etienne Borgers: "Re: RARA-AVIS: Willeford's PICK-UP and WILD WIVES" Messages sorted by: [ date ] [ thread ] [ subject ] [ author ] PICK-UP (1955) was the first Charles Willeford novel I ever read, around 1990 or 1991. I got it because it was reprinted by Black Lizard, and I was buying anything they put out. (I bet a lot of us did that, and that's why we're here today.) I remember being confused because the setting of the book didn't match the original publication date they mentioned (1967), but they were referring to an earlier reprint. I thought it was great when I read it back then. I just reread it for the first time since, and to my surprise I didn't like it as much. The first half, where Harry and Helen drink, actually seemed dull. Perhaps I'm just not as interested in reading about the depressing lives of relentless alcoholics. I'd forgotten Harry was an artist, though, and was interested to see Willeford had used painting there (and in WILD WIVES, where there's a Klee collectorKlee is mentioned in PICK-UP). When Helen died and Harry went to jail, that's where things seemed to click into place and I was back in Willeford territorythe matter-of-factness of it all, the desire for peace and quiet in a cell, the police and lawyers he meets, the irony of his art finally becoming valuable.

24. Online Encyclopedia And Dictionary - Continuum Hypothesis In mathematics, the continuum hypothesis is a hypothesis about the possible sizes of infinite sets. Georg Cantor introduced the concept of cardinality to compare the sizes of http://fact-archive.com/encyclopedia/Generalized_continuum_hypothesis

Search The Online Encyclopedia and Dictionary Encyclopedia Dictionary Quotes Categories ... Conjectures Continuum hypothesis (Redirected from Generalized continuum hypothesis In mathematics , the continuum hypothesis is a hypothesis about the possible sizes of infinite sets Georg Cantor introduced the concept of cardinality to compare the sizes of infinite sets, and he showed that the set of integers is strictly smaller than the set of real numbers . The continuum hypothesis states the following: There is no set whose size is strictly between that of the integers and that of the real numbers. Or mathematically speaking, noting that the cardinality for the integers is aleph-null ") and the cardinality of the real numbers is , the continuum hypothesis says: The real numbers have also been called the continuum , hence the name. There is also a generalization of the continuum hypothesis called the generalized continuum hypothesis Contents showTocToggle("show","hide") 1 The size of a set 2 Investigating the continuum hypothesis 3 Impossibility of proof and disproof 4 The generalized continuum hypothesis ... 6 References The size of a set To state the hypothesis formally, we need a definition: we say that two sets

25. What Is Godel's Theorem? : Scientific American The most popular one is the Continuum Hypothesis (see http//en.wikipedia.org/ wiki/continuum_hypothesis ) http://www.scientificamerican.com/article.cfm?id=what-is-godels-theorem

26. Continuum Hypothesis Summary And Analysis Summary | BookRags.com Continuum hypothesis summary with 13 pages of lesson plans, quotes, chapter summaries, analysis, encyclopedia entries, essays, research information, and more. http://www.bookrags.com/Continuum_hypothesis

27. Econbrowser: Corporate Tax Policy, Budget Deficits And The Capital Stock In A Ne Sep 3, 2008 Godel s Incompleteness Theorem, the Continuum Hypothesis (http//en. wikipedia.org/wiki/continuum_hypothesis) or the Halting Problem http://www.econbrowser.com/archives/2008/09/corporate_tax_p.html

Econbrowser Analysis of current economic conditions and policy Main September 03, 2008 Corporate tax policy, budget deficits and the capital stock in a neoclassical model of investment Or, What would be the net effect on investment of the McCain tax plan? Figure 1: Real nonresidential fixed investment (blue) and investment in equipment and software (red), SAAR. NBER defined recession dates shaded gray. Source: BEA GDP release of August 28, 2008, and NBER. As noted in a previous post , the McCain and Obama campaigns have many different components. The McCain tax plan involves a series of tax reductions aimed at lowering the cost of capital facing firms, with the aim at spurring investment; and as Jim pointed out , investment is a key determinant in our future prosperity. On the other hand, one particularly substantial difference with the Obama plan is that, as scored by the respective campaigns' officials and tabulated by the nonpartisan Tax Policy Center, the McCain tax plan involves a $1.3 trillion dollar larger cumulative budget deficit over FY2009-2018. This suggests to me countervailing effects from implementing a McCain tax policy.

28. Bambooweb: Continuum Hypothesis In mathematics, the continuum hypothesis is a hypothesis about the possible sizes of infinite sets. Georg Cantor introduced t http://bambooweb.com/articles/c/o/Continuum_hypothesis.html

Continuum hypothesis In mathematics , the continuum hypothesis is a hypothesis about the possible sizes of infinite sets Georg Cantor introduced the concept of cardinality to compare the sizes of infinite sets, and he showed that the set of integers is strictly smaller than the set of real numbers . The continuum hypothesis states the following: There is no set whose size is strictly between that of the integers and that of the real numbers. Or mathematically speaking, noting that the cardinality aleph-null The real numbers have also been called the continuum , hence the name. There is also a generalization of the continuum hypothesis called the generalized continuum hypothesis , which is described at the end of this article. Top The size of a set To state the hypothesis formally, we need a definition: we say that two sets S and T have the same cardinality or cardinal number if there exists a bijection S with elements of T in such a fashion that every element of S is paired off with exactly one element of T With infinite sets such as the set of integers or rational numbers , things are more complicated to show. Consider the set of all rational numbers. One might naively suppose that there are more rational numbers than integers, and fewer rational numbers than real numbers, thus disproving the continuum hypothesis. However, it turns out that the rational numbers can be placed in one-to-one correspondence with the integers, and therefore the set of rational numbers is the same size as the set of integers: they are both

29. 13 Comments 1 2 Sidney Roberta Burton Jun 09, 2010 1043 PM This statement, known as the Continuum Hypothesis, has a rich history; and like Euclid s (See http//en.wikipedia.org/wiki/continuum_hypothesis) http://www.newcriterion.com/ajax/CommentPage_dev.cfm?ArticleID=5315&StartFro

30. Continuum Hypothesis In - Dictionary And Translation continuum hypothesis. Dictionary terms for continuum hypothesis, definition for continuum hypothesis, Thesaurus and Translations of continuum hypothesis to Chinese, English http://www.babylon.com/definition/continuum_hypothesis/

31. What Is Half Of Infinity? | Answerbag Jun 29, 2006 2) The generalized continuum hypothesis (GCH) states that if an infinite set s http//en.wikipedia.org/wiki/continuum_hypothesis http://www.answerbag.com/q_view/62243

32. Title Translate this page Continuum Hypothesis. \aleph _0 Generalized Continuum Hypothesis http://www.mathramz.com/math/continuum_hypothesis dir=rtl

33. Continuum Hypothesis - Definition In mathematics, the continuum hypothesis is a hypothesis about the possible sizes of infinite sets. Georg Cantor introduced the concept of cardinality to compare the sizes of http://www.wordiq.com/definition/Continuum_hypothesis

Continuum hypothesis - Definition In mathematics , the continuum hypothesis is a hypothesis about the possible sizes of infinite sets Georg Cantor introduced the concept of cardinality to compare the sizes of infinite sets, and he showed that the set of integers is strictly smaller than the set of real numbers . The continuum hypothesis states the following: There is no set whose size is strictly between that of the integers and that of the real numbers. Or mathematically speaking, noting that the cardinality aleph-null The real numbers have also been called the continuum , hence the name. There is also a generalization of the continuum hypothesis called the generalized continuum hypothesis Contents showTocToggle("show","hide") 1 The size of a set 2 Investigating the continuum hypothesis 3 Impossibility of proof and disproof 4 The generalized continuum hypothesis ... 6 References The size of a set To state the hypothesis formally, we need a definition: we say that two sets S and T have the same cardinality or cardinal number if there exists a bijection S with elements of T in such a fashion that every element of S is paired off with exactly one element of T With infinite sets such as the set of integers or rational numbers , things are more complicated to show. Consider the set of all rational numbers. One might naively suppose that there are more rational numbers than integers, and fewer rational numbers than real numbers, thus disproving the continuum hypothesis. However, it turns out that the rational numbers can be placed in one-to-one correspondence with the integers, and therefore the set of rational numbers is the same size as the set of integers: they are both

34. Logical Independence | Facebook Translate this page a href= /pages/w/112429132106143 continuum hypothesis /a and the a . org/wiki/continuum_hypothesis%23The_generalized_continuum_hypothesis http://ja-jp.facebook.com/pages/Logical-independence/110697202287055

Logical independence to connect with Wall Info Fan Photos Logical independence + Others Logical independence Just Others Logical independence changed their Description September 7 at 8:00am Logical independence joined Facebook. April 6 at 2:52pm See More Posts English (US) Español More… Download a Facebook bookmark for your phone. Login Facebook ©2010

35. Continuum Hypothesis - Gilparha Translate this page 2007 12 25 ZF- Continuum Hypothesis ( ), ( ) . http://gilparha.org/wiki/index.php/Continuum_Hypothesis

Continuum Hypothesis Gilparha 이 page는 앞으로 많이 보태질 계획입니다. 연속체 가설 (Continuum Hypothesis) 연속체(Continuum) ’(Continuum Hypothesis)이라 부른다. 이 문제는 D.Hilbert가 1900년 파리에서 열린 세계 수학자회의에서 20세기가 다 가기전에 풀어야 할 들이 등장하면서 집합론을 '공리'들로부터 엄격하게 형식논리에 맞게 쌓아올렸는데 그 중 가장 정립된 시스템이 ZF시스템이다. (공리들의 체계를 잡은 Zermelo와 Frenkel의 이름을 딴 것이다.) 이 형식체계는 아직도 이 안에서 모순된 두 문장이 유도될 수 있는 것인지 증명이 안되었다. 아직까지는 거부할만한 어떤 증거도 없이 100여년 째 발전해가고 있다. 이 시스템에 기초하여 위의 연속체 가설의 반이 풀린다. Times지가 2000년에 전세계 영향력있는 수학자들에게 물어 뽑은 20세기 가장위대한 수학자로 뽑힌 ZF-집합론이 무모순인 체계이면 Continuum Hypothesis의 부정은 증명할 수 없다. 나머지 반이 풀리기까지 다시 수십년이 걸렸는데, 1963년 P.Cohen 이 나머지 반을 풀었다. 이 결과 또한 괴델의 결과만큼 놀라운 것이었다.

36. Continuum Hypothesis In Korean - Dictionary And Translation Translate this page continuum hypothesis. Get Babylon s Translation Software! . (Continuum hypothesis) . http://www.babylon.com/definition/continuum_hypothesis/Korean

37. ASP Translate this page continuum hypothesis, 1963 Cohen ZF , http//nostalgia.wikipedia.org/wiki/continuum_hypothesis , http://www.mathland.idv.tw/talk-over/memo.asp?srcid=20955&bname=ASP

38. Slashdot | What Do You Believe Even If You Can't Prove It? Jan 5, 2005 we know that the number of integers is less than the number of reals and http//en.wikipedia.org/wiki/continuum_hypothesis) . http://science.slashdot.org/science/05/01/05/1451235.shtml

39. Continuum Hypothesis - Discussion And Encyclopedia Article. Who Is Continuum Hyp Continuum hypothesis. Discussion about Continuum hypothesis. Ecyclopedia or dictionary article about Continuum hypothesis. http://www.knowledgerush.com/kr/encyclopedia/Continuum_hypothesis/

40. Continuum Hypothesis - Academic Kids In mathematics, the continuum hypothesis is a hypothesis about the possible sizes of infinite sets. Georg Cantor introduced the concept of cardinality to compare the sizes of http://www.academickids.com/encyclopedia/index.php/Continuum_hypothesis

Continuum hypothesis From Academic Kids In mathematics , the continuum hypothesis is a hypothesis about the possible sizes of infinite sets Georg Cantor introduced the concept of cardinality to compare the sizes of infinite sets, and he showed that the set of integers is strictly smaller than the set of real numbers . The continuum hypothesis states the following: There is no set whose size is strictly between that of the integers and that of the real numbers. Or mathematically speaking, noting that the cardinality aleph-null ") and the cardinality of the real numbers The real numbers have also been called the continuum , hence the name. There is also a generalization of the continuum hypothesis called the generalized continuum hypothesis Contents showTocToggle("show","hide") 1 The size of a set 2 Investigating the continuum hypothesis 3 Impossibility of proof and disproof 4 The generalized continuum hypothesis ... edit The size of a set To state the hypothesis formally, we need a definition: we say that two sets S and T have the same cardinality or cardinal number if there exists a bijection S with elements of T in such a fashion that every element of S is paired off with exactly one element of T With infinite sets such as the set of integers or rational numbers , things are more complicated to show. Consider the set of all rational numbers. One might naively suppose that there are more rational numbers than integers, and fewer rational numbers than real numbers, thus disproving the continuum hypothesis. However, it turns out that the rational numbers can be placed in one-to-one correspondence with the integers, and therefore the set of rational numbers is the same size as the set of integers: they are both

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