Monge Ampere equation : applications to geometry and optimization : NSFCBMS Conference on the Monge Ampere Equation, Applications to Geometry and Optimization, July 913, 1997, Florida Atlantic University

Contributor(s): Caffarelli Luis A | Milman MarioMaterial type: Computer fileComputer fileSeries: Contemporary mathematics ; v. 226Publication details: Providence, R.I. : American Mathematical Society, c1999Description: 1 online resource (ix, 172 p. : ill.)ISBN: 9780821878170 (online)Subject(s): Geometry | Mathematical optimization | MongeAmpere equationsOnline resources: Click here to access online
Contents:
A numerical method for the optimal timecontinuous mass transport problem and related problems ; On the numerical solution of the problem of reflector design with given farfield scattering data ; Applications of the MongeAmpere equation and Monge transport problem to meteorology and oceanography ; Growth of a sandpile around an obstacle ; The Monge mass transfer problem and its applications ; Gradient estimates for solutions of nonparametric curvature evolution with prescribed contact angle condition ; An extension of the Kantorovich norm ; Optimal locations and the mass transport problem ; A generalized MongeAmpere equation arising in compressible flow ; Selfsimilar solutions of Gauss curvature flows JeanDavid Benamou and Yann Brenier ; Luis A Caffarelli Sergey A Kochengin and Vladimir I Oliker ; M J P Cullen and R J Douglas ; Mikhail Feldman ; Wilfrid Gangbo ; Bo Guan ; Leonid G Hanin ; Michael McAsey and Libin Mou ; Elsa Newman and L Pamela Cook ; John Urbas
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Includes bibliographical references.

A numerical method for the optimal timecontinuous mass transport problem and related problems ; On the numerical solution of the problem of reflector design with given farfield scattering data ; Applications of the MongeAmpere equation and Monge transport problem to meteorology and oceanography ; Growth of a sandpile around an obstacle ; The Monge mass transfer problem and its applications ; Gradient estimates for solutions of nonparametric curvature evolution with prescribed contact angle condition ; An extension of the Kantorovich norm ; Optimal locations and the mass transport problem ; A generalized MongeAmpere equation arising in compressible flow ; Selfsimilar solutions of Gauss curvature flows JeanDavid Benamou and Yann Brenier ; Luis A Caffarelli Sergey A Kochengin and Vladimir I Oliker ; M J P Cullen and R J Douglas ; Mikhail Feldman ; Wilfrid Gangbo ; Bo Guan ; Leonid G Hanin ; Michael McAsey and Libin Mou ; Elsa Newman and L Pamela Cook ; John Urbas

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