solving systems of equations
Improved the Convergence of Iterative Methods for Solving Systems of Equations by Memetics Techniques
... for solving systems of ...of equations is transformed into an optimization ...of equations is solved using an iterative method with the initial vector obtained in the previous ...of ...
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Multi-Step Preconditioned Newton Methods for Solving Systems of Nonlinear Equations
... In this section, we develop some preconditioned iterative methods for solving systems of nonlinear equations. We generalize the idea of preconditioning in such a way that the quadratic convergence ...
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The LA = U Decomposition Method for Solving Systems of Linear Equations
... for solving systems of linear equations is presented based on direct decomposition of the coefficient matrix using the form LAX LB B = = ′ ...
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A Quasi-Newton Population Migration Algorithm for Solving Systems of Nonlinear Equations
... for solving nonlinear equations, such as high sensitivity to the initial guess of the solution, poor convergence reliability and can’t get all solutions, ...for solving systems of nonlinear ...
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A Multistep Broyden’s -Type Method for Solving Systems of Nonlinear Equations
... However, despite the fact that the Newton’s method is simple to implement and has a quadratic rate of convergence, still it requires the computation and storage of n n Jacobian matrix and its inverse, and also requires ...
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A new numerical scheme for solving systems of integro-differential equations
... for solving the systems of Volterra integro-differential ...for systems with separable or difference ker- ...for solving systems of Volterra integro- differential equations with ...
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A New Numerical Technique for Solving Systems Of Nonlinear Fractional Partial Differential Equations
... solve systems of nonliner fractional partial differential ...for solving systems of nonlinear fractional partial differential equations in other areas of ...
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Soccer League Competition Algorithm, a New Method for Solving Systems of Nonlinear Equations
... Solving systems of nonlinear equations is one of the main concerns in a diverse range of engineering applica- tions such as computational mechanics, weather forecast, hydraulic analysis of water ...
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A Strong Method for Solving Systems of Integro Differential Equations
... for solving systems of integro-differential equations using Cheby- shev wavelets ...for solving linear and non-linear systems of integro-difieren- tial equations, and plots ...
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An efficient FHE proposal based on the hardness of solving systems of nonlinear multivariate equations (II)
... polynomial. This private-key cryptosystem is not homomorphic in the sense that the vector sum is not a homomorphic operator. Non-linear homomorphic operators are then developed. The security relies on the difficulty of ...
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A projected Hessian Gauss Newton algorithm for solving systems of nonlinear equations and inequalities
... Abstract. Solving systems of nonlinear equations and inequalities is of critical impor- tance in many engineering ...for solving general nonlinear systems of equalities and ...
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Using Homo Separation of Variables for Solving Systems of Nonlinear Fractional Partial Differential Equations
... solve systems of FPDEs, such as the variational iteration method [12], the Adomian decomposition method [2], the homotopy perturbation method [13] and the homotopy analysis method ...
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ME 310 Numerical Methods. Solving Systems of Linear Algebraic Equations
... • To solve an nxn system of equations, Cramer’s rule needs n+1 determinant evaluations. Using a recursive algorithm, determinant of an nxn matrix requires 2n!+2n-1 arithmetic operations (+,-,x,÷). Therefore ...
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Application of Different H(x) in Homotopy Analysis Methods for Solving Systems of Linear Equations
... Approximating the solutions of the system of linear and nonlinear equations has widespread applications in ap- plied mathematics [1]-[11]. Many techniques including homotopy perturbation method (HPM) [12] and ...
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An efficient numerical approach for solving systems of high-order linear Volterra integral equations
... In this article, we have studied a numerical scheme to solve a system of Volterra integral equations with variable coecients. This method is based on the Bernoulli collocation method used for some problems of ...
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Linear Programming by Solving Systems of Differential Equations Using Game Theory
... Firstly we reduce the problems to the form (12) or (12’) and we consider the matriceal game for which we can find the Nash equilibrium by solving the initial problem and its dual. The way to reduce the problem to ...
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Solving systems of nonlinear matrix equations involving Lipshitzian mappings
... In the last few years, there has been a constantly increasing interest in developing the theory and numerical approaches for HPD (Hermitian positive definite) solutions to different classes of nonlinear matrix ...
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2.2/2.3 - Solving Systems of Linear Equations
... There is a built-in function on your calculator that will put a matrix in reduced row-echelon form. To use this function, you must have a matrix where the number of rows is less than or equal to the number of columns. ...
9
Solving Linear Systems of Equations using a Memetic Algorithm
... Jordan, Crammer, LU or Gauss-Seidel, determine a single solution of system or fail. To discover more than one solution (if exist) is used an incremental search of the initial interval. In present approach, the size of ...
7
On Solving Systems of Autonomous Ordinary Differential Equations by Reduction to a Variable of an Algebra
... differential equations to an autonomous ordinary differential equation on one variable of the algebra; 2 a technique, previously introduced for solving di ff erential equations over C, is shown to work ...
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