In this paper, we derive a variant of the Taylor theorem to obtain a new minimized remainder. For a given function $f$ defined on the interval $[a,b]$, this formula is derived by introducing a linear combination of $f'$ computed at $n+1$ equally spaced points in $[a,b]$, together with $f''(a)$ and $f''(b)$. We then consider two classical applications of this Taylor-like expansion: the interpolation error and the numerical quadrature formula. We show that using this approach improves both the Lagrange $P_2$ - interpolation error estimate and the error bound of the Simpson rule in numerical integration
Functions are one of the most used aspects of mathematics. It lets us calculate, represent and appro...
AbstractA quadrature formula containing two free (phase) parameters k, k′, and recently written by V...
We present a variant of the classical integration by parts to introduce a new type of Taylor series ...
This paper is devoted to a new first order Taylor-like formula, where the corresponding remainder is...
The aim of this paper is to derive a refined first-order expansion formula in Rn, the goal being to ...
A straightforward three-point quadrature formula of closed type is derived that improves on Simpson'...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
International audienceThe aim of this paper is to derive a refined first-order expansion formula in ...
We present a new algorithm for automatically bounding the Taylor remainder series. In the special ca...
In this note we point out an estimate for the remainder in the generalised Taylor formula which impr...
New estimates of the remainder in Taylor\u27s formula are given. © 2001 Academic Press
A method is given for finding roots of a one-variable function using Taylor's expansion of that func...
In this paper we give an historical synopsis of various Taylor remainders and their di erent proofs ...
The general form of Taylor's theorem gives the formula, f = Pn + Rn, where Pn is the Newton's interp...
AbstractWe derive an explicit formula for the remainder term of a Taylor polynomial of a matrix func...
Functions are one of the most used aspects of mathematics. It lets us calculate, represent and appro...
AbstractA quadrature formula containing two free (phase) parameters k, k′, and recently written by V...
We present a variant of the classical integration by parts to introduce a new type of Taylor series ...
This paper is devoted to a new first order Taylor-like formula, where the corresponding remainder is...
The aim of this paper is to derive a refined first-order expansion formula in Rn, the goal being to ...
A straightforward three-point quadrature formula of closed type is derived that improves on Simpson'...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
International audienceThe aim of this paper is to derive a refined first-order expansion formula in ...
We present a new algorithm for automatically bounding the Taylor remainder series. In the special ca...
In this note we point out an estimate for the remainder in the generalised Taylor formula which impr...
New estimates of the remainder in Taylor\u27s formula are given. © 2001 Academic Press
A method is given for finding roots of a one-variable function using Taylor's expansion of that func...
In this paper we give an historical synopsis of various Taylor remainders and their di erent proofs ...
The general form of Taylor's theorem gives the formula, f = Pn + Rn, where Pn is the Newton's interp...
AbstractWe derive an explicit formula for the remainder term of a Taylor polynomial of a matrix func...
Functions are one of the most used aspects of mathematics. It lets us calculate, represent and appro...
AbstractA quadrature formula containing two free (phase) parameters k, k′, and recently written by V...
We present a variant of the classical integration by parts to introduce a new type of Taylor series ...