Complete metric space

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31Theory and Applications of Categories, Vol. 28, No. 22, 2013, pp. 696–732. TIGHT SPANS, ISBELL COMPLETIONS AND SEMI-TROPICAL MODULES SIMON WILLERTON Abstract. In this paper we consider generalized metric spaces in the

Theory and Applications of Categories, Vol. 28, No. 22, 2013, pp. 696–732. TIGHT SPANS, ISBELL COMPLETIONS AND SEMI-TROPICAL MODULES SIMON WILLERTON Abstract. In this paper we consider generalized metric spaces in the

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Source URL: www.emis.de

Language: English - Date: 2013-08-22 11:25:00
32Theory and Applications of Categories, Vol. 28, No. 3, 2013, pp. 66–122. DUALITY FOR DISTRIBUTIVE SPACES DIRK HOFMANN Abstract. The main source of inspiration for the present paper is the work of R. Rosebrugh and R.J.

Theory and Applications of Categories, Vol. 28, No. 3, 2013, pp. 66–122. DUALITY FOR DISTRIBUTIVE SPACES DIRK HOFMANN Abstract. The main source of inspiration for the present paper is the work of R. Rosebrugh and R.J.

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Source URL: www.emis.de

Language: English - Date: 2013-01-28 11:57:00
33S T U D E N T M AT H E M AT I C A L L I B R A RY Volume 4 Problems in Mathematical Analysis I

S T U D E N T M AT H E M AT I C A L L I B R A RY Volume 4 Problems in Mathematical Analysis I

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Source URL: www.ams.org

Language: English - Date: 2001-12-15 11:02:50
34Decompositional Computation of Operating Guidelines Using Free Choice Conflicts Niels Lohmann∗ Universit¨ at Rostock, Institut f¨ ur Informatik,  Rostock, Germany

Decompositional Computation of Operating Guidelines Using Free Choice Conflicts Niels Lohmann∗ Universit¨ at Rostock, Institut f¨ ur Informatik,  Rostock, Germany

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Source URL: CEUR-WS.org

Language: English - Date: 2008-08-27 09:51:08
35HOMEWORK #5 - MA 504 PAULINHO TCHATCHATCHA Chapter 3, problem 5. For any two real sequences {an }, {bn }, prove that lim sup(an + bn ) ≤ lim sup an + lim sup bn , n→∞

HOMEWORK #5 - MA 504 PAULINHO TCHATCHATCHA Chapter 3, problem 5. For any two real sequences {an }, {bn }, prove that lim sup(an + bn ) ≤ lim sup an + lim sup bn , n→∞

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Source URL: www.math.purdue.edu

Language: English - Date: 2010-09-28 11:02:00
36COUNTABLE BOREL EQUIVALENCE RELATIONS SIMON THOMAS AND SCOTT SCHNEIDER Introduction. These notes are based upon a day-long lecture workshop presented by Simon Thomas at the University of Ohio at Athens on November 17, 20

COUNTABLE BOREL EQUIVALENCE RELATIONS SIMON THOMAS AND SCOTT SCHNEIDER Introduction. These notes are based upon a day-long lecture workshop presented by Simon Thomas at the University of Ohio at Athens on November 17, 20

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Source URL: www.math.cmu.edu

Language: English - Date: 2010-06-30 09:01:47
37GENERAL ⎜ ARTICLE How did Cantor Discover Set Theory and Topology? S M Srivastava In order to solve a precise problem on trigonometric series, “Can a function have more than

GENERAL ⎜ ARTICLE How did Cantor Discover Set Theory and Topology? S M Srivastava In order to solve a precise problem on trigonometric series, “Can a function have more than

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Source URL: www.ias.ac.in

Language: English - Date: 2014-11-12 12:41:34
38(1) Purpose and application. This rule applies to all activities in confined spaces and provides requirements to protect employees from the hazards of entering and working in confined spaces. (2) Exceptions. This standar

(1) Purpose and application. This rule applies to all activities in confined spaces and provides requirements to protect employees from the hazards of entering and working in confined spaces. (2) Exceptions. This standar

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Source URL: www.cbs.state.or.us

Language: English - Date: 2014-12-04 04:20:36
392 Sequences and Series In this chapter we will study two related questions. Given an infinite collection X of numbers, which can be taken to be rational, real or complex, the first question is to know if there is a li

2 Sequences and Series In this chapter we will study two related questions. Given an infinite collection X of numbers, which can be taken to be rational, real or complex, the first question is to know if there is a li

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Source URL: www.math.caltech.edu

Language: English - Date: 2010-10-16 18:41:12
40Notes on Vector Calculus Dinakar Ramakrishnan March, 2010 Chapter 1 Subsets of Euclidean space, vector

Notes on Vector Calculus Dinakar Ramakrishnan March, 2010 Chapter 1 Subsets of Euclidean space, vector

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Source URL: www.math.caltech.edu

Language: English - Date: 2010-03-16 20:12:42