Countable set

Results: 55



#Item
11Polish spaces and Baire spaces Jordan Bell Department of Mathematics, University of Toronto June 27, 2014

Polish spaces and Baire spaces Jordan Bell Department of Mathematics, University of Toronto June 27, 2014

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Source URL: individual.utoronto.ca

Language: English - Date: 2014-06-27 12:42:16
12LOGIC AND THE METHODOLOGY OF SCIENCE PRELIMINARY EXAMINATION 1. Prove or disprove: For any uncountable well-ordered set (X, <) there is a countable well-ordered set (Y, <) for which (X, <) ≡ (Y, <). 2. Suppose that L i

LOGIC AND THE METHODOLOGY OF SCIENCE PRELIMINARY EXAMINATION 1. Prove or disprove: For any uncountable well-ordered set (X, <) there is a countable well-ordered set (Y, <) for which (X, <) ≡ (Y, <). 2. Suppose that L i

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Source URL: logic.berkeley.edu

Language: English - Date: 2014-08-24 16:43:20
13CS109A Notes for LectureWhy Study In nite Sets?  Occasionally useful | sometimes in CS you reason about in nite sequences of events or other in nite things.  Intellectually challenging.

CS109A Notes for LectureWhy Study In nite Sets?  Occasionally useful | sometimes in CS you reason about in nite sequences of events or other in nite things.  Intellectually challenging.

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Source URL: infolab.stanford.edu

Language: English - Date: 2008-09-19 00:58:29
14Recursion Theory Frank Stephan October 8, 2012 Recursion theory deals with the fundamental concepts on what subsets of natural numbers (or other famous countable domains) could be defined effectively and how

Recursion Theory Frank Stephan October 8, 2012 Recursion theory deals with the fundamental concepts on what subsets of natural numbers (or other famous countable domains) could be defined effectively and how

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Source URL: www.comp.nus.edu.sg

Language: English - Date: 2012-10-08 00:46:12
15I-CONTINUITY IN TOPOLOGICAL SPACES Martin Sleziak Abstract. In this paper we generalize the notion of I-continuity, which was defined in [1] for real functions, to maps on topological spaces. We study the classes of

I-CONTINUITY IN TOPOLOGICAL SPACES Martin Sleziak Abstract. In this paper we generalize the notion of I-continuity, which was defined in [1] for real functions, to maps on topological spaces. We study the classes of

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Source URL: thales.doa.fmph.uniba.sk

Language: English - Date: 2004-01-31 17:04:36
16Set theory / Infinity / Elementary mathematics / Countable set / Cardinality / Georg Cantor / Real number / Aleph number / Number / Mathematics / Mathematical logic / Cardinal numbers

17 March[removed]Cantor’s Infinities

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Source URL: www.gresham.ac.uk

Language: English - Date: 2015-03-18 05:15:37
17Mathematical Methods of Engineering Analysis Erhan C¸inlar Robert J. Vanderbei February 2, 2000

Mathematical Methods of Engineering Analysis Erhan C¸inlar Robert J. Vanderbei February 2, 2000

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Source URL: www.princeton.edu

Language: English - Date: 2000-11-21 09:57:00
18Mathematical Methods of Engineering Analysis Erhan C¸inlar Robert J. Vanderbei February 2, 2000

Mathematical Methods of Engineering Analysis Erhan C¸inlar Robert J. Vanderbei February 2, 2000

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Source URL: www.princeton.edu

Language: English - Date: 2000-11-21 09:57:00
19Religious Studies 38, 147–166 # 2002 Cambridge University Press DOI : [removed]S0034412502005978 Printed in the United Kingdom Craig on the actual infinite wes morriston Department of Philosophy, University of Colorado

Religious Studies 38, 147–166 # 2002 Cambridge University Press DOI : [removed]S0034412502005978 Printed in the United Kingdom Craig on the actual infinite wes morriston Department of Philosophy, University of Colorado

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Source URL: stripe.colorado.edu

Language: English - Date: 2007-02-04 11:07:45
20ORDER AND ARITHMETIC OF CARDINALITIES PETE L. CLARK Here we pursue Cantor’s theory of cardinalities of infinite sets a bit more deeply. We also begin to take a more sophisticated approach in that we identify which res

ORDER AND ARITHMETIC OF CARDINALITIES PETE L. CLARK Here we pursue Cantor’s theory of cardinalities of infinite sets a bit more deeply. We also begin to take a more sophisticated approach in that we identify which res

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Source URL: math.uga.edu

Language: English - Date: 2012-08-06 14:14:25