Homotopy-Based Methods in Water Engineering av Manotosh (Texas A&M University USA) Kumbhakar, Vijay P. (Texas A&M University USA) Singh

1219,-

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<P>Most complex physical phenomena can be described by nonlinear equations, specifically, differential equations. In water engineering, nonlinear differential equations play a vital role in modeling physical processes. Analytical solutions to strong nonlinear problems are not easily tractable, and existing techniques are problem-specific and applicable for specific types of equations. Exploring the concept of homotopy from topology, different kinds of homotopy-based methods have been proposed for analytically solving nonlinear differential equations, given by approximate series solutions. <I>Homotopy-Based Methods in Water Engineering </I>attempts to present the wide applicability of these methods to water engineering problems. It solves all kinds of nonlinear equations, namely algebraic/transcendental equations, ordinary differential equations (ODEs), systems of ODEs, partial differential equations (PDEs), systems of PDEs, and integro-differential equations using the homotopy-based me

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Homotopy-Based Methods in Water Engineering av Manotosh (Texas A&M University USA) Kumbhakar, Vijay P. (Texas A&M University USA) Singh - Nelo