We present an acceleration technique for the Secant method. The Secant method is a root-searching algorithm for a general function f. We exploit the fact that the combination of two Secant steps leads to an improved, so-called first-order approximant of the root. The original Secant algorithm can be modified to a first-order accelerated algorithm which generates a sequence of first-order approximants. This process can be repeated: two nth order approximants can be combined in a (n+1)th order approximant and the algorithm can be modified to an (n+1)th order accelerated algorithm which generates a sequence of such approximants. We show that the sequence of nth order approximants converges to the root with the same order as methods using polyn...
In this thesis, we present four algorithms for solving sparse nonlinear systems of equations: the pa...
AbstractThis paper describes and analyzes a simple technique that accelerates the convergence of ite...
The mathematical model P of a real life problem is, typically, a set of complicated non-linear diffe...
AbstractThe secant method is one of the most popular methods for root finding. Standard text books i...
The secant method is one of the most popular methods for root finding. Standard text books in numeri...
This study presents an improvement to the secant method by reconstruction, in numerical analysis,the...
The secant method is a very effective numerical procedure used for solving nonlinear equations of th...
A geometric modification to the Newton-Secant method to obtain the root of a nonlinear equation is d...
AbstractTo improve the efficiency of the straightforward algorithm for general secant methods in sev...
AbstractIt has been shown that the so-called secant method for finding roots of real-valued function...
Some modifications of the secant method for solving nonlinear equations are revisited and the local ...
A family of improved secant-like method is proposed in this paper. Further, the analysis of the conv...
AbstractIn this paper, we present a new secant-like method for solving nonlinear equations. Analysis...
Cubic polynomial, Newton's MethodSteps of the secant root finding method for a cubic polynomial. The...
AbstractThe Θ̂-algorithm is a general extrapolation procedure for accelerating the convergence of se...
In this thesis, we present four algorithms for solving sparse nonlinear systems of equations: the pa...
AbstractThis paper describes and analyzes a simple technique that accelerates the convergence of ite...
The mathematical model P of a real life problem is, typically, a set of complicated non-linear diffe...
AbstractThe secant method is one of the most popular methods for root finding. Standard text books i...
The secant method is one of the most popular methods for root finding. Standard text books in numeri...
This study presents an improvement to the secant method by reconstruction, in numerical analysis,the...
The secant method is a very effective numerical procedure used for solving nonlinear equations of th...
A geometric modification to the Newton-Secant method to obtain the root of a nonlinear equation is d...
AbstractTo improve the efficiency of the straightforward algorithm for general secant methods in sev...
AbstractIt has been shown that the so-called secant method for finding roots of real-valued function...
Some modifications of the secant method for solving nonlinear equations are revisited and the local ...
A family of improved secant-like method is proposed in this paper. Further, the analysis of the conv...
AbstractIn this paper, we present a new secant-like method for solving nonlinear equations. Analysis...
Cubic polynomial, Newton's MethodSteps of the secant root finding method for a cubic polynomial. The...
AbstractThe Θ̂-algorithm is a general extrapolation procedure for accelerating the convergence of se...
In this thesis, we present four algorithms for solving sparse nonlinear systems of equations: the pa...
AbstractThis paper describes and analyzes a simple technique that accelerates the convergence of ite...
The mathematical model P of a real life problem is, typically, a set of complicated non-linear diffe...