COLLOCATION METHODS FOR THE NUMERICAL BIFURCATION ANALYSIS: OF SYSTEMS OF NONLINEAR PARTIAL DIFFERENTIAL EQUATIONS,Used

COLLOCATION METHODS FOR THE NUMERICAL BIFURCATION ANALYSIS: OF SYSTEMS OF NONLINEAR PARTIAL DIFFERENTIAL EQUATIONS,Used

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The study of nonlinear phenomena has been an important endeavor for scientists. Some nonlinear phenomena can be modeled mathematically as nonlinear partial differential equations (PDEs). There are no analytical solutions for most nonlinear PDEs. Therefore, an appropriate numerical method must be used in order to compute an adequate approximate solution. A new class of numerical methods, called Finite Element Collocation Methods with Discontinuous Piecewise Polynomials, can be used for solving nonlinear elliptic PDE. In this book, this method has been generalized for solving nonlinear elliptic PDE systems using an alternative nested dissection solution procedure. Using a modified formulation of the pseudoarclength continuation method, we have used this method in continuation studies and in the numerical bifurcation analysis of nonlinear PDE systems. In this book the method is introduced gradually, starting with the simplest case, linear ODE BVPs, followed by nonlinear ODE BVPs, linear scalar PDEs, nonlinear scalar PDEs, continuation problems in nonlinear scalar PDEs, and, finally, continuation problems for systems of nonlinear PDEs.

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