Add to ORKGHere we report building a numerical method for finding the zeros of a function of one real variable using the apparatus of nonclassical Newton's minorants and diagrams of functions', given in the tabular form. The examples of the search for zeros of functions are given.A problem on finding the roots of equations belongs to important problems of applied mathematics. Classical methods of finding the zeroes of functions require first to isolate the roots and then to find them. In order to find a separate root with a given accuracy, it is necessary to choose one of the points in the vicinity that contains the root as the initial approximation and to employ an appropriate iterative process.The numerical method constructed does not require additi...
AbstractWe propose a new algorithm for the classical and still practically important problem of appr...
HNumerical Methods are very important in Engineering because many real problems have complicated mat...
Given a system of N nonlinear (algebraic or transcendental) real equations in N real unknowns, there...
In this paper, we developed two new numerical algorithms for finding zeros of nonlinear equations in...
The functions studied in high school are summarized in polynomials of first and second degree, modul...
Computing all the zeros of an analytic function and their respective multiplicities, locating cluste...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...
This outstanding text for graduate students and researchers proposes improvements to existing algori...
In this paper we propose two algorithms based on branch and bound method and reduced interval tec...
Abstract. In this paper Newton’s method is derived, the general speed of convergence of the method i...
Treballs finals del Màster en Matemàtica Avançada, Facultat de matemàtiques, Universitat de Barcelon...
AbstractIt is shown that a globally convergent zero finding method named the numerical integration e...
This chapter describes several basic methods for computing zeros of functions and then combines thre...
The conventional Newton’s method for finding a zero of a function F: Rn → Rn, assuming that (F ′(y))...
AbstractA Maple algorithm for the computation of the zeros of orthogonal polynomials (OPs) and speci...
AbstractWe propose a new algorithm for the classical and still practically important problem of appr...
HNumerical Methods are very important in Engineering because many real problems have complicated mat...
Given a system of N nonlinear (algebraic or transcendental) real equations in N real unknowns, there...
In this paper, we developed two new numerical algorithms for finding zeros of nonlinear equations in...
The functions studied in high school are summarized in polynomials of first and second degree, modul...
Computing all the zeros of an analytic function and their respective multiplicities, locating cluste...
Numerical methods are used to approximate solutions of equations when exact solutions can not be det...
This outstanding text for graduate students and researchers proposes improvements to existing algori...
In this paper we propose two algorithms based on branch and bound method and reduced interval tec...
Abstract. In this paper Newton’s method is derived, the general speed of convergence of the method i...
Treballs finals del Màster en Matemàtica Avançada, Facultat de matemàtiques, Universitat de Barcelon...
AbstractIt is shown that a globally convergent zero finding method named the numerical integration e...
This chapter describes several basic methods for computing zeros of functions and then combines thre...
The conventional Newton’s method for finding a zero of a function F: Rn → Rn, assuming that (F ′(y))...
AbstractA Maple algorithm for the computation of the zeros of orthogonal polynomials (OPs) and speci...
AbstractWe propose a new algorithm for the classical and still practically important problem of appr...
HNumerical Methods are very important in Engineering because many real problems have complicated mat...
Given a system of N nonlinear (algebraic or transcendental) real equations in N real unknowns, there...