Symbolic computation of exact solutions expressible in hyperbolic and elliptic functions for nonlinear PDEs |
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| Affiliation: | 1. Department of Mathematical and Computer Sciences, Colorado School of Mines, Golden, CO 80401-1887, USA;2. Wolfram Research, Inc., 100 Trade Center Drive, Champaign, IL 61820, USA;3. Department of Applied Mathematics, University of Stellenbosch, Private Bag X1, 7602 Matieland, South Africa;4. Department of Engineering and Applied Sciences, Harvard University, Cambridge, MA 02138, USA;5. Department of Applied Mathematics and Theoretical Physics, Churchill College, University of Cambridge, Cambridge, CB3 0DS, UK |
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| Abstract: | Algorithms are presented for the tanh- and sech-methods, which lead to closed-form solutions of nonlinear ordinary and partial differential equations (ODEs and PDEs). New algorithms are given to find exact polynomial solutions of ODEs and PDEs in terms of Jacobi’s elliptic functions.For systems with parameters, the algorithms determine the conditions on the parameters so that the differential equations admit polynomial solutions in tanh, sech, combinations thereof, Jacobi’s sn or cn functions. Examples illustrate key steps of the algorithms.The new algorithms are implemented in Mathematica. The package PDESpecialSolutions.m can be used to automatically compute new special solutions of nonlinear PDEs. Use of the package, implementation issues, scope, limitations, and future extensions of the software are addressed.A survey is given of related algorithms and symbolic software to compute exact solutions of nonlinear differential equations. |
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