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dc.contributor.authorCheung, T-Yaten_US
dc.description.abstractConstrained minimization problems are formulated from a quasilinear parabolic boundary value problem (probably with nonlinear boundary conditions), making use of the latters (conditional) inverse-positive property. Approximate solutions and three error bounds can be obtained by solving these minimization problems by linear programming and discretization techniques. Numerical results are obtained using splines as basis functions.en_US
dc.publisherUniversity of Wisconsin-Madison Department of Computer Sciencesen_US
dc.titleQuasilinear Parabolic Boundary Value Problems. Approximate Solutions and Error Bounds by Linear Programmingen_US
dc.typeTechnical Reporten_US

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  • CS Technical Reports
    Technical Reports Archive for the Department of Computer Sciences at the University of Wisconsin-Madison

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