AbstractThe classical Lagrange inversion theorem is a concrete, explicit form of the implicit function theorem for real analytic functions. An explicit construction shows that the formula is not true for all merely smooth functions. The authors modify the Lagrange formula by replacing the smooth function by its Maclaurin polynomials. The resulting modified Lagrange series is, in analogy to the Maclaurin polynomials, an approximation to the solution function accurate to o(xN) as x→0
One of the problems on which a great deal of focus is being placed today, is how to teach Calculus i...
AbstractLet Ln[f] denote the Lagrange interpolation polynomial to a function f at the zeros of a pol...
AbstractIn this article, we investigate and compare a number of real inversion formulas for the Lapl...
AbstractThe classical Lagrange inversion theorem is a concrete, explicit form of the implicit functi...
AbstractA new proof of Good's generalization to several variables of the Lagrange inversion formula ...
In the paper, by virtue of the Faà di Bruno formula, properties of the Bell polynomials of the secon...
Forthcoming on Archive for History of Exact SciencesInternational audienceWe reconstruct essential f...
I show that the general implicit-function problem (or parametrized fixed-point problem) in one compl...
AbstractThe main theme of the present paper is to establish a formula for calculating the Inverse La...
The Lagrange inversion formula is a fundamental tool in combinatorics. In this work, we investigate ...
summary:An infinite series which arises in certain applications of the Lagrange-Bürmann formula to e...
When Lagrange wrote his masterpiece Mecanique Analytique, the foundations of analysis were not compl...
AbstractInversion formulas for integral transforms with kernels defined as solutions of differential...
AbstractIf Φ(x) is defined on [−1, 1], let Ln(Φ, x) denote the Lagrange interpolation polynomial of ...
AbstractIt is shown that the polynomials {Lnα,M0,M1,…,MN(x)}n = 0∞ defined by Lnα,M0M1,…,MN(x)=∑k=0N...
One of the problems on which a great deal of focus is being placed today, is how to teach Calculus i...
AbstractLet Ln[f] denote the Lagrange interpolation polynomial to a function f at the zeros of a pol...
AbstractIn this article, we investigate and compare a number of real inversion formulas for the Lapl...
AbstractThe classical Lagrange inversion theorem is a concrete, explicit form of the implicit functi...
AbstractA new proof of Good's generalization to several variables of the Lagrange inversion formula ...
In the paper, by virtue of the Faà di Bruno formula, properties of the Bell polynomials of the secon...
Forthcoming on Archive for History of Exact SciencesInternational audienceWe reconstruct essential f...
I show that the general implicit-function problem (or parametrized fixed-point problem) in one compl...
AbstractThe main theme of the present paper is to establish a formula for calculating the Inverse La...
The Lagrange inversion formula is a fundamental tool in combinatorics. In this work, we investigate ...
summary:An infinite series which arises in certain applications of the Lagrange-Bürmann formula to e...
When Lagrange wrote his masterpiece Mecanique Analytique, the foundations of analysis were not compl...
AbstractInversion formulas for integral transforms with kernels defined as solutions of differential...
AbstractIf Φ(x) is defined on [−1, 1], let Ln(Φ, x) denote the Lagrange interpolation polynomial of ...
AbstractIt is shown that the polynomials {Lnα,M0,M1,…,MN(x)}n = 0∞ defined by Lnα,M0M1,…,MN(x)=∑k=0N...
One of the problems on which a great deal of focus is being placed today, is how to teach Calculus i...
AbstractLet Ln[f] denote the Lagrange interpolation polynomial to a function f at the zeros of a pol...
AbstractIn this article, we investigate and compare a number of real inversion formulas for the Lapl...