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The following pages link to An Iterative Algorithm for Solving a System of Nonlinear Algebraic Equations, F ( x )= 0 , Using the System of ODEs with an Optimum a in d x = l [ a F +(1 - a ) B T F ]; B ij =dF i /dx j (Q3113031):

Displaying 13 items.

A new meshless method for solving steady-state nonlinear heat conduction problems in arbitrary plane domain (Q1655137) (← links)
A novel class of highly efficient and accurate time-integrators in nonlinear computational mechanics (Q1705164) (← links)
A dynamical Tikhonov regularization for solving ill-posed linear algebraic systems (Q1938001) (← links)
A simple and efficient method with high order convergence for solving systems of nonlinear equations (Q2006128) (← links)
A double optimal iterative algorithm in an affine Krylov subspace for solving nonlinear algebraic equations (Q2006521) (← links)
Bifurcation \& chaos in nonlinear structural dynamics: novel \& highly efficient optimal-feedback accelerated Picard iteration algorithms (Q2206027) (← links)
A globally optimal tri-vector method to solve an ill-posed linear system (Q2511179) (← links)
A Further Study on Using dot x = l [ a R + b P ] ( P = F - R ( F · R )/ R 2 ) and dotF x = l [ a F + b P * ] ( P * = R - F ( F · R )/ F 2 ) in Iteratively Solving the Nonlinear System of Algebraic Equations F ( x )= 0 (Q2964570) (← links)
Iterative Solution of a System of Nonlinear Algebraic Equations F ( x )=0, Using dot x = l [ a R + b P ] or dot x = l [ a F + b P * ] R is a Normal to a Hyper-Surface Function of F , P Normal to R , and P * Normal to F (Q2964575) (← links)
A Globally Optimal Iterative Algorithm Using the Best Descent Vector \mathaccentV dot05F x = l [ a c F + B T F ], with the Critical Value a c , for Solving a System of Nonlinear Algebraic Equations F ( x )= 0 (Q2964632) (← links)
A New Optimal Scheme for Solving Nonlinear Heat Conduction Problems (Q2964729) (← links)
A Scalar Homotopy Method for Solving an Over/Under-Determined System of Non-Linear Algebraic Equations (Q3112807) (← links)
The Global Nonlinear Galerkin Method for the Solution of von Karman Nonlinear Plate Equations: An Optimal & Faster Iterative Method for the Direct Solution of Nonlinear Algebraic Equations F ( x ) = 0 , using \mathaccentV dot 05 F x = l [ a F + (1 - a ) B (Q5406055) (← links)