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Cousin problems. In mathematics, the Cousin problems are two questions in several complex variables, concerning the existence of meromorphic functions that are specified in terms of local data. They were introduced in special cases by Pierre Cousin in 1895. They are now posed, and solved, for any complex manifold M, in terms of conditions on M .
Journal of Number Theory. Journal of Online Mathematics and its Applications. Journal of Physics A. Journal of Recreational Mathematics. Journal of Statistical Mechanics: Theory and Experiment. Journal of Symbolic Computation. Journal of Symbolic Logic. Journal of the American Mathematical Society.
Inter-universal Teichmüller theory (abbreviated as IUT or IUTT) is the name given by mathematician Shinichi Mochizuki to a theory he developed in the 2000s, following his earlier work in arithmetic geometry. According to Mochizuki, it is "an arithmetic version of Teichmüller theory for number fields equipped with an elliptic curve ".
Sion's minimax theorem. In mathematics, and in particular game theory, Sion's minimax theorem is a generalization of John von Neumann 's minimax theorem, named after Maurice Sion . It states: Let be a compact convex subset of a linear topological space and a convex subset of a linear topological space. If is a real-valued function on with.
Kathryn Mann. Kathryn Mann is a mathematician who has won the Rudin Award, Birman Prize, Duszenko Award, and Sloan Fellowship for her research in geometric topology and geometric group theory. She is an associate professor of mathematics at Cornell University .
De Branges's theorem. In complex analysis, de Branges's theorem, or the Bieberbach conjecture, is a theorem that gives a necessary condition on a holomorphic function in order for it to map the open unit disk of the complex plane injectively to the complex plane. It was posed by Ludwig Bieberbach ( 1916) and finally proven by Louis de Branges ...
Oka was born in Osaka. He went to Kyoto Imperial University in 1919, turning to mathematics in 1923 and graduating in 1924. He was in Paris for three years from 1929, returning to Hiroshima University. He published solutions to the first and second Cousin problems, and work on domains of holomorphy, in the period 1936–1940.
The classical eikonal equation in geometric optics is a differential equation of the form. (1) where lies in an open subset of , is a positive function, denotes the gradient, and is the Euclidean norm. The function is given and one seeks solutions . In the context of geometric optics, the function is the refractive index of the medium.
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