AbstractLet f:C→C have a multiple zero α with integer multiplicity m≥1 and be analytic in a sufficiently small neighborhood of α. For parameter-controlled Newton-secant method defined by xn+1=xn−λf(xn)2f′(xn)⋅{f(xn)−f(xn−μf(xn)/f′(xn))},n=0,1,2,…, we investigate the maximal order of convergence and the theoretical asymptotic error constant by seeking the relationship between parameters λ and μ. For various test functions, the numerical method has shown a satisfactory result with high-precision Mathematica programming
AbstractThe secant method is one of the most popular methods for root finding. Standard text books i...
AbstractThe paper presents a convergence analysis of a modified Newton method for solving nonlinear ...
Abstract. The classical Newton–Kantorovich method for solving systems of equations f(x) = 0 uses th...
We propose the numerical method defined by xn+1 = xn − λ[f(xn − μh(xn))/]f'(xn) , n ∈ N, and determi...
Abstract. By combining the classical Newton’s method with the pseudo-secant method, pseudo-secant-Ne...
AbstractWe introduce two families of Newton-type methods for multiple roots with cubic convergence. ...
AbstractRecently, a modification of the Newton method for finding a zero of a univariate function wi...
AbstractWe consider a modification of the Newton method for finding a zero of a univariate function....
A construct is developed which is useful in the investigation of the global convergence properties o...
AbstractRecently, there has been some progress on Newton-type methods with cubic convergence that do...
We consider a modification of the Newton method for finding a zero of a univariate function. The cas...
AbstractIn this paper, we discuss two variants of Newton's method without using any second derivativ...
The secant method is a very effective numerical procedure used for solving nonlinear equations of th...
AbstractConsider a complex sequence {λk}k=0∞ convergent to λ∗∈C with order p∈N. The convergence fact...
A geometric modification to the Newton-Secant method to obtain the root of a nonlinear equation is d...
AbstractThe secant method is one of the most popular methods for root finding. Standard text books i...
AbstractThe paper presents a convergence analysis of a modified Newton method for solving nonlinear ...
Abstract. The classical Newton–Kantorovich method for solving systems of equations f(x) = 0 uses th...
We propose the numerical method defined by xn+1 = xn − λ[f(xn − μh(xn))/]f'(xn) , n ∈ N, and determi...
Abstract. By combining the classical Newton’s method with the pseudo-secant method, pseudo-secant-Ne...
AbstractWe introduce two families of Newton-type methods for multiple roots with cubic convergence. ...
AbstractRecently, a modification of the Newton method for finding a zero of a univariate function wi...
AbstractWe consider a modification of the Newton method for finding a zero of a univariate function....
A construct is developed which is useful in the investigation of the global convergence properties o...
AbstractRecently, there has been some progress on Newton-type methods with cubic convergence that do...
We consider a modification of the Newton method for finding a zero of a univariate function. The cas...
AbstractIn this paper, we discuss two variants of Newton's method without using any second derivativ...
The secant method is a very effective numerical procedure used for solving nonlinear equations of th...
AbstractConsider a complex sequence {λk}k=0∞ convergent to λ∗∈C with order p∈N. The convergence fact...
A geometric modification to the Newton-Secant method to obtain the root of a nonlinear equation is d...
AbstractThe secant method is one of the most popular methods for root finding. Standard text books i...
AbstractThe paper presents a convergence analysis of a modified Newton method for solving nonlinear ...
Abstract. The classical Newton–Kantorovich method for solving systems of equations f(x) = 0 uses th...