| Beardon, Alan: University of Cambridge. Geometric function theory and hyperbolic geometry in general, but especially in relation to complex continued fractions, discrete Mobius groups and Riemann surfaces; dynamical systems and potential theory. |
| Carne, T. Keith: University of Cambridge. Geometric complex analysis, statistical theory of shape. Lecture notes. |
| Draghia, Dumitru D.: Continuity in Banach Algebras. |
| Gowers, W. Timothy: Analysis, combinatorics, number theory. Fields medal 1998. |
| Iwasawa, Kazuhiro: Royal Bank of Scotland. Mathematical finance. Site contains research papers as well as math and computing links. |
| Jameson, Graham: Lancaster University. Banach spaces and operator ideals; classical inequalities related to linear operators; (very) analytic number theory. Publications, resources. |
| Körner, Tom: University of Cambridge. The behaviour of Fourier transforms towards infinity; intricate counterexamples. Lecture notes, helpful advice. |
| Li, Chenkuan: Brandon University. Analysis, Banach spaces and differential equations. Publications, teaching, awards and humor. |
| Morales, Claudio: Professor of Mathematics at the University of Alabama in Huntsville. Research in the unification of the general theory of accretive operators defined on Banach spaces. |
| O'Neil, Toby Christoper: Open University. Real analysis and measure theory. Research papers and conference talks. |
| Partington, Jonathan: University of Leeds. Functional Analysis. Publications and research projects. |
| Ponce, Augusto C.: Laboratoire de Mathématiques et Physique Théorique. Nonlinear elliptic partial differential equations. Publications and research projects. |
| Radulescu, Vicentiu: University of Craiova, Romania. Nonlinear analysis, variational calculus and mathematical physics. |
| Safarov, Yuri: King's College London. Online book covers eigenvalues in partial differential equations. Other publications cover basic, real and Fourier analysis. In pdf format. |
| Terras, Audrey: University of California at San Diego. Fourier analysis on groups. Papers, books. |
| Tyson, Jeremy T.: University of Illinois at Urbana-Champaign. Conformal and geometric function theory, analysis on metric spaces, sub-Riemannian geometry and fractals. List of papers and preprints |
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