| 1. | Lodwick, Weldon | | | Research focused on optimization, differential algebra equations, geographic information systems, bio-medicine, environment applications and fuzzy industrial scheduling. University of Colorado at Denver. Page includes biography, hobbies, curriculum vitae, and publications.
www-math.cudenver.edu |
| 2. | Knyazev, Andrew | | | Specializes in numerical mathematics at the University of Colorado at Denver. Includes resume, teaching philosophy, research articles and conferences attended.
www-math.cudenver.edu |
| 4. | Strang, Gilbert | | | MIT. Lecture notes, text and research papers in numerical linear algebra and wavelets.
www-math.mit.edu |
| 5. | Lai, Choi-Hong | | | University of Greenwich. Research papers and activities in computational science and engineering, especially aeroacoustics.
www.gre.ac.uk |
| 6. | Bejancu, Aurelian | | | University of Cambridge. Multivariate splines.
www.damtp.cam.ac.uk |
| 7. | Hauser, Raphael | | | University of Oxford. Optimization; Numerical Analysis on the Stiefel and Grassmann manifolds; Applied stochastic processes in operations research.
web.comlab.ox.ac.uk |
| 8. | Iserles, Arieh | | | University of Cambridge. Research interests in numerical ordinary differential equations; also functional equations, approximation theory, special functions, numerical partial differential equations, nonlinear algebraic equations and nonlinear dynamical systems.
www.damtp.cam.ac.uk |
| 9. | Liu, Yunkang | | | University of Cambridge. Analytic solution (stability and asymptotics) and numerical solution (Runge--Kutta methods and numerical stability) of functional differential equations; Qualitative numerical methods for solving differential equations with conservation laws.
www.damtp.cam.ac.uk |
| 10. | Sabin, Malcolm | | | University of Cambridge and Numerical Geometrics Ltd. Research interests: the mathematics of curves and surfaces; other issues in geometric computing; problems of making robust and reliable software.
www.damtp.cam.ac.uk |
| 12. | Gavaghan, David | | | University of Oxford. The application of numerical methods in medical research and associated basic sciences.
web.comlab.ox.ac.uk |
| 13. | Giles, Mike | | | University of Oxford. Development and analysis of numerical methods for partial differential equations, particularly in computational fluid dynamics; parallel and distributed computing.
web.comlab.ox.ac.uk |
| 14. | Klawonn, Axel | | | University of Essen. Numerical Methods for Partial Differential Equations.
www.uni-essen.de |
| 15. | Mulcahy, Colm | | | Spelman College. Curves and Surfaces in the Digital Age.
www.spelman.edu |
| 16. | Süli, Endre | | | University of Oxford. Error analysis of discretisation methods for partial differential equations: finite element and finite volume methods.
web.comlab.ox.ac.uk |
| 17. | Sobey, Ian | | | University of Oxford. Computational and experimental fluid mechanics; medical engineering and oilfield applications.
web.comlab.ox.ac.uk |
| 18. | Trefethen, Nick | | | University of Oxford. Numerical analysis; applied mathematics; eigenvalue problems.
web.comlab.ox.ac.uk |
| 19. | Wathen, Andy | | | University of Oxford. Numerical analysis of methods for partial differential equations; numerical linear algebra.
web.comlab.ox.ac.uk |
| 20. | Xu, Jinchao | | | Pennsylvania State University. Numerical methods for PDEs and in particular finite element methods; multigrid methods for theoretical analysis, algorithmic developments and practical applications.
www.math.psu.edu |
| 21. | Givoli, Dan | | | Finite Element Methods, numerical methods for wave problems, numerical methods in nonlinear solid mechanics, problems in infinite domains, combination of numerical and analytical methods, analysis of space structures.
ae-www.technion.ac.il |
| 22. | Higham, Nick | | | University of Manchester. Numerical linear algebra, numerical analysis, scientific computation.
www.ma.man.ac.uk |
| 23. | Mandel, Jan | | | Professor at the University of Colorado at Denver. Analysis and design of numerical algorithms, particularly iterative solvers for very large systems.
www-math.cudenver.edu |
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