Solution manifolds and submanifolds of parametrized equations and their discretization errors |
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Authors: | James P. Fink Werner C. Rheinboldt |
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Affiliation: | (1) Institute for Computational Mathematics and Applications, Department of Mathematics and Statistics, University of Pittsburgh, 15260 Pittsburgh, PA, USA |
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Abstract: | Summary The paper concerns solution manifolds of nonlinear parameterdependent equations (1)F(u, )=y0 involving a Fredholm operatorF between (infinite-dimensional) Banach spacesX=Z× andY, and a finitedimensional parameter space . Differntial-geometric ideas are used to discuss the connection between augmented equations and certain onedimensional submanifolds produced by numerical path-tracing procedures. Then, for arbitrary (finite) dimension of , estimates of the error between the solution manifold of (1) and its discretizations are developed. These estimates are shown to be applicable to rather general nonlinear boundaryvalue problems for partial differential equations.This work was in part supported by the U.S. Air Force Office of Scientific Research under Grant 80-0176, the National Science Foundation under Grant MCS-78-05299, and the Office of Naval Research under Contract N-00014-80-C-0455 |
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Keywords: | AMS(MOS): 65R05 CR: G1.8 |
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