AbstractWe show that, under convenient hypotheses, partial elimination in nonlinear systems can be used to improve convergence in the Jacobi, Gauss-Seidel and Newton iterations
Basing on the theory of dynamic systems with inclomplete corrections [1-2], various methods of Gauss...
AbstractIn the last two decades many papers have appeared in which the application of an iterative m...
This paper is devoted to studying the global and finite convergence of the semi-smooth Newton method...
AbstractWe show that, under convenient hypotheses, partial elimination in nonlinear systems can be u...
AbstractWhen convergent Jacobi or Gauss-Seidel iterations can be applied to solve systems of linear ...
AbstractThe improvement in convergence by means of accurate functional elimination in the context of...
AbstractConvergence is improved in the context of the monotone Newton theorem if the starting points...
Monotone iterations for nonlinear equations with application to Gauss-Seidel method
Copyright @ 1989 Pergamon Press plc Abstract. We consider an iterative algorithm in which several co...
Analysis of real life problems often results in linear systems of equations for which solutions are ...
AbstractThis paper describes a way of approximating the optimal extrapolation of iterative technique...
AbstractThe celebrated Banach fixed point theorem provides conditions which assure that the method o...
Abstract. We present a new unified proof for the convergence of both the Jacobi and the Gauss–Seidel...
Physical systems are usually modeled by differential equations, but solving these differential equat...
AbstractBy means of successive partial substitutions, new fixed point linear equations can be obtain...
Basing on the theory of dynamic systems with inclomplete corrections [1-2], various methods of Gauss...
AbstractIn the last two decades many papers have appeared in which the application of an iterative m...
This paper is devoted to studying the global and finite convergence of the semi-smooth Newton method...
AbstractWe show that, under convenient hypotheses, partial elimination in nonlinear systems can be u...
AbstractWhen convergent Jacobi or Gauss-Seidel iterations can be applied to solve systems of linear ...
AbstractThe improvement in convergence by means of accurate functional elimination in the context of...
AbstractConvergence is improved in the context of the monotone Newton theorem if the starting points...
Monotone iterations for nonlinear equations with application to Gauss-Seidel method
Copyright @ 1989 Pergamon Press plc Abstract. We consider an iterative algorithm in which several co...
Analysis of real life problems often results in linear systems of equations for which solutions are ...
AbstractThis paper describes a way of approximating the optimal extrapolation of iterative technique...
AbstractThe celebrated Banach fixed point theorem provides conditions which assure that the method o...
Abstract. We present a new unified proof for the convergence of both the Jacobi and the Gauss–Seidel...
Physical systems are usually modeled by differential equations, but solving these differential equat...
AbstractBy means of successive partial substitutions, new fixed point linear equations can be obtain...
Basing on the theory of dynamic systems with inclomplete corrections [1-2], various methods of Gauss...
AbstractIn the last two decades many papers have appeared in which the application of an iterative m...
This paper is devoted to studying the global and finite convergence of the semi-smooth Newton method...
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