Related categories 3
Sites 23
University of California Riverside. Research interests: quantum gravity and n-categories. Regular column on "This Week's Finds in Mathematical Physics".
Researcher in String Theory and Mathematical Physics. Website contains several online tools (e.g. cohomCalg), research information and popular-scientific / introductory texts.
Includes a biography comparing him with other contemporaries of his, references and quotations.
A biography of the Mathematican who worked on differential equations and created the form now call Sturm-Liouville equations.
University of York. Quantum field theory and mathematical physics, particularly interested in integrable quantum field theories with a boundary. Publications, talks, teaching material, meetings.
Includes a brief biography and bibliography.
Includes a brief biography and a reference list.
A brief biography of Cartan and exposition of his work in applied topology.
A biography including quotations from his writings and contemporary articles.
A short biography on the mathematician who created Stokes's theorem
Rutgers University. Research on string theory and M-theory, with a particular emphasis on the underlying mathematical structures and applications to and from modern mathematics.
The mathematician whose work with coordinate transformations is still common in mathematical physics
The mathematician who developed Hankel functions and the Hankel transform.
The mathematician who analysed the orbit of Uranus and predicted a possible extra planet.
A short biography on the man who invented the Fourier series and transforms.
The mathematician who developed Sturm-Liouville differential equations.
University of Wollongong. Non-linear chemical dynamics.
NYU graduate, now on the faculty at Cooper Union for the Advancement of Science and Art in New York. Includes selected publications.
A short history of the life and work of Sophus Lie, whose work, Lie groups, has applications in quantum mechanics in relativity.
A list of personal web pages related to symmetries and integrability.
Department of Biological Physics. Eötvös Loránd University. Budapest, Hungary. Specializes in statistical physics.
A short biography on Volterra and his work in differential equations and mathematical physics.
Overview of the life and works of the man who has given many topological (and other) contributions to mathematical physics.
A short biography on the man who invented the Fourier series and transforms.
Includes a brief biography and bibliography.
A biography including quotations from his writings and contemporary articles.
The mathematician who developed Sturm-Liouville differential equations.
The mathematician who developed Hankel functions and the Hankel transform.
Includes a biography comparing him with other contemporaries of his, references and quotations.
A short biography on Volterra and his work in differential equations and mathematical physics.
A biography of the Mathematican who worked on differential equations and created the form now call Sturm-Liouville equations.
A short biography on the mathematician who created Stokes's theorem
Researcher in String Theory and Mathematical Physics. Website contains several online tools (e.g. cohomCalg), research information and popular-scientific / introductory texts.
The mathematician whose work with coordinate transformations is still common in mathematical physics
Includes a brief biography and a reference list.
The mathematician who analysed the orbit of Uranus and predicted a possible extra planet.
University of York. Quantum field theory and mathematical physics, particularly interested in integrable quantum field theories with a boundary. Publications, talks, teaching material, meetings.
NYU graduate, now on the faculty at Cooper Union for the Advancement of Science and Art in New York. Includes selected publications.
University of California Riverside. Research interests: quantum gravity and n-categories. Regular column on "This Week's Finds in Mathematical Physics".
University of Wollongong. Non-linear chemical dynamics.
A brief biography of Cartan and exposition of his work in applied topology.
A list of personal web pages related to symmetries and integrability.
A short history of the life and work of Sophus Lie, whose work, Lie groups, has applications in quantum mechanics in relativity.
Rutgers University. Research on string theory and M-theory, with a particular emphasis on the underlying mathematical structures and applications to and from modern mathematics.
Overview of the life and works of the man who has given many topological (and other) contributions to mathematical physics.
Department of Biological Physics. Eötvös Loránd University. Budapest, Hungary. Specializes in statistical physics.
