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4![Suprema of L´ evy processes Jacek Malecki Wroclaw University We study the supremum functional Mt = sup0≤s≤t Xs , where Xt , t ≥ 0, is a one-dimensional L´evy process. Under very mild assumptions we provide a simp Suprema of L´ evy processes Jacek Malecki Wroclaw University We study the supremum functional Mt = sup0≤s≤t Xs , where Xt , t ≥ 0, is a one-dimensional L´evy process. Under very mild assumptions we provide a simp](https://www.pdfsearch.io/img/20b4b3a82e3d87f1d2a689dff37bc030.jpg) | Add to Reading ListSource URL: icsaa.iam.uni-bonn.de- Date: 2012-11-26 04:39:27
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6![Advanced Program Analyses for Object-oriented Systems Dr. Barbara G. Ryder Rutgers University http://www.cs.rutgers.edu/~ryder http://prolangs.rutgers.edu/ Advanced Program Analyses for Object-oriented Systems Dr. Barbara G. Ryder Rutgers University http://www.cs.rutgers.edu/~ryder http://prolangs.rutgers.edu/](https://www.pdfsearch.io/img/a363facfab63d1b0ce0467f46d5f65d7.jpg) | Add to Reading ListSource URL: people.cs.vt.eduLanguage: English - Date: 2007-12-23 13:13:59
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8![9th ASCE Specialty Conference on Probabilistic Mechanics and Structural Reliability PMC2004 COMPUTATION OF UPPER AND LOWER BOUNDS IN LIMIT ANALYSIS USING SECOND-ORDER CONE PROGRAMMING AND MESH ADAPTIVITY 9th ASCE Specialty Conference on Probabilistic Mechanics and Structural Reliability PMC2004 COMPUTATION OF UPPER AND LOWER BOUNDS IN LIMIT ANALYSIS USING SECOND-ORDER CONE PROGRAMMING AND MESH ADAPTIVITY](https://www.pdfsearch.io/img/ccbce8155abbef18e9cc72f8264bf8e5.jpg) | Add to Reading ListSource URL: raphael.mit.eduLanguage: English - Date: 2005-08-31 10:34:50
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9![Course Notes for Math 320: Fundamentals of Mathematics Analysis. May 4, [removed] Course Notes for Math 320: Fundamentals of Mathematics Analysis. May 4, [removed]](https://www.pdfsearch.io/img/071c9e4dab51c735a27b303a79ac276c.jpg) | Add to Reading ListSource URL: www.csun.eduLanguage: English - Date: 2006-05-04 16:33:52
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10![2001 Paper 1 Question 8 Discrete Mathematics Let (A, 6A ) and (B, 6B ) be partially ordered sets. (a) Define the product order on A×B and prove that it is a partial order. [4 marks] 2001 Paper 1 Question 8 Discrete Mathematics Let (A, 6A ) and (B, 6B ) be partially ordered sets. (a) Define the product order on A×B and prove that it is a partial order. [4 marks]](https://www.pdfsearch.io/img/9bd88ebd56d4f0c51bd660baed9960f2.jpg) | Add to Reading ListSource URL: www.cl.cam.ac.ukLanguage: English - Date: 2014-06-09 10:17:39
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