distinguished%20solutions
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1: Ronald F. Boisvert
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►His research interests include numerical solution of partial differential equations, mathematical software, and information services that support computational science.
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►Department of Commerce Gold Medal for Distinguished Achievement in the Federal Service in 2011, and an Outstanding Alumni Award from the Purdue University Department of Computer Science in 2012.
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2: Stephen M. Watt
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►Prior to joining the University of Waterloo, Watt was Distinguished University Professor of the University of Western Ontario and Professor at the University of Nice-Sophia Antipolis.
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3: Frank W. J. Olver
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►He is particularly known for his extensive work in the study of the asymptotic solution of differential equations, i.
…, the behavior of solutions as the independent variable, or some parameter, tends to infinity, and in the study of the particular solutions of differential equations known as special functions (e.
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►Department of Commerce Gold Medal, the highest honorary award granted by the Department, and was inducted into the NIST Portrait Gallery of Distinguished Scientists, Engineers, and Administrators.
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4: 3.6 Linear Difference Equations
§3.6 Linear Difference Equations
… ►§3.6(ii) Homogeneous Equations
… ►Then is said to be a recessive (equivalently, minimal or distinguished) solution as , and it is unique except for a constant factor. … … ► …5: Ranjan Roy
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► Allendoerfer Award, the MAA Wisconsin Section teaching award and the MAA Deborah and Franklin Tepper Haimo award for distinguished Mathematics Teaching.
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6: Wadim Zudilin
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►He received the Distinguished Award of the Hardy–Ramanujan Society in 2001 and was one of the co-recipients of the 2014 G.
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7: Mourad E. H. Ismail
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► 1944, in Cairo, Egypt) is a Distinguished Research Professor in the Department of Mathematics of the University of Central Florida.
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8: Charles W. Clark
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►Clark received the R&D 100 Award, Distinguished Presidential Rank Award of the U.
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9: 27.15 Chinese Remainder Theorem
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►The Chinese remainder theorem states that a system of congruences , always has a solution if the moduli are relatively prime in pairs; the solution is unique (mod ), where is the product of the moduli.
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►Their product has 20 digits, twice the number of digits in the data.
…These numbers, in turn, are combined by the Chinese remainder theorem to obtain the final result , which is correct to 20 digits.
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