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
An explicit method for finding every coefficient of the reversed series of a power series in one var...
Lagrange's theorem on the expansion of inverse functions is generalized for functions of two variabl...
An expansion of a certain class of generalized functions is given in a series of Laguerre polynomial...
AbstractThe classical Lagrange inversion theorem is a concrete, explicit form of the implicit functi...
I show that the general implicit-function problem (or parametrized fixed-point problem) in one compl...
Nonlinear problems arise in most of the scientific fields. In general, such behavior is represented ...
It is proposed an extension of the Riemann inversion formula that can be used for computing the inve...
Forthcoming on Archive for History of Exact SciencesInternational audienceWe reconstruct essential f...
AbstractAn algorithm that yields every coefficient of the reversed series of a formal power series i...
ABSTRACT. There are presently three distinct q-analogues of the Lagrange inversion problem. By relat...
summary:In order to use the well known representation of the Mellin transform as a combination of tw...
Implicit equations play a crucial role in Engineering. Based on this importance, several techniques ...
AbstractIt is shown how Good's extension of the Lagrange inversion formula for n variables can be de...
AbstractWe give a simple combinatorial proof a Langrange inversion theorem for species and derive fr...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
An explicit method for finding every coefficient of the reversed series of a power series in one var...
Lagrange's theorem on the expansion of inverse functions is generalized for functions of two variabl...
An expansion of a certain class of generalized functions is given in a series of Laguerre polynomial...
AbstractThe classical Lagrange inversion theorem is a concrete, explicit form of the implicit functi...
I show that the general implicit-function problem (or parametrized fixed-point problem) in one compl...
Nonlinear problems arise in most of the scientific fields. In general, such behavior is represented ...
It is proposed an extension of the Riemann inversion formula that can be used for computing the inve...
Forthcoming on Archive for History of Exact SciencesInternational audienceWe reconstruct essential f...
AbstractAn algorithm that yields every coefficient of the reversed series of a formal power series i...
ABSTRACT. There are presently three distinct q-analogues of the Lagrange inversion problem. By relat...
summary:In order to use the well known representation of the Mellin transform as a combination of tw...
Implicit equations play a crucial role in Engineering. Based on this importance, several techniques ...
AbstractIt is shown how Good's extension of the Lagrange inversion formula for n variables can be de...
AbstractWe give a simple combinatorial proof a Langrange inversion theorem for species and derive fr...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
An explicit method for finding every coefficient of the reversed series of a power series in one var...
Lagrange's theorem on the expansion of inverse functions is generalized for functions of two variabl...
An expansion of a certain class of generalized functions is given in a series of Laguerre polynomial...