Monge Ampère equation: applications to geometry and optimization. Proceedings of the NSF-CBMS conference, Deerfield Beach, FL, USA, July 9–13, 1997. (English) Zbl 0903.00039

Contemporary Mathematics. 226. Providence, RI: American Mathematical Society (AMS). ix, 172 p. (1999).

Show indexed articles as search result.

The articles of this volume will be reviewed individually.
Indexed articles:
Benamou, Jean-David; Brenier, Yann, A numerical method for the optimal time-continuous mass transport problem and related problems, 1-11 [Zbl 0916.65068]
Caffarelli, Luis A.; Kochengin, Sergey A.; Oliker, Vladimir I., On the numerical solution of the problem of reflector design with given far-filed scattering data, 13-32 [Zbl 0917.65104]
Cullen, M. J. P.; Douglas, R. J., Applications of the Monge-Ampère equation and Monge transport problem to meteorology and oceanography, 33-53 [Zbl 0919.35106]
Feldman, Mikhail, Growth of a sandpile around an obstacle, 55-78 [Zbl 0924.35176]
Gangbo, Wilfrid, The Monge mass transfer problem and its applications, 79-104 [Zbl 0930.49025]
Guan, Bo, Gradient estimates for solutions of nonparametric curvature evolution with prescribed contact angle condition, 105-112 [Zbl 0923.35080]
Hanin, Leonid G., An extension of the Kantorovich norm, 113-130 [Zbl 0926.46009]
McAsey, Michael; Mou, Libin, Optimal locations and the mass transport problem, 131-148 [Zbl 0915.90177]
Newman, Elsa; Cook, L. Pamela, A generalized Monge-Ampère equation arising in compressible flow, 149-156 [Zbl 0920.35116]
Urbas, John, Self-similar solutions of Gauss curvature flows, 157-172 [Zbl 0919.35043]


00B25 Proceedings of conferences of miscellaneous specific interest
35-06 Proceedings, conferences, collections, etc. pertaining to partial differential equations
49-06 Proceedings, conferences, collections, etc. pertaining to calculus of variations and optimal control
Full Text: DOI