An explicit method for finding every coefficient of the reversed series of a power series in one variable is presented. We also show how implicit functions on the plane may be solved for one of the variables. Our approach to the Lagrange inversion formula is based on factorization properties of partitions of integers and distributions of distinguishable objects. These results and techniques may have many applications in numerical analysis, combinatorics, and soliton theory. © 1987 D. Reidel Publishing Company.13427328
summary:In order to use the well known representation of the Mellin transform as a combination of tw...
AbstractVarious inversion formulae, especially the beautiful generalized Mobius inversion formula, p...
Abstract. In this paper we shall establish a general result involving Dirichlet product of arithmeti...
AbstractAn algorithm that yields every coefficient of the reversed series of a formal power series i...
Abstract. For each natural number n, we characterise the invertible series (under composition) that ...
AbstractThis paper gives a brief exposition of several recent results obtained by the authors concer...
Abstract. We give an algorithm to compute the series expansion for the inverse of a given function. ...
We give an algorithm to compute the series expansion for the inverse of a given function. The algori...
[ACCESS RESTRICTED TO THE UNIVERSITY OF MISSOURI AT REQUEST OF AUTHOR.] In this master's thesis, we ...
I show that the general implicit-function problem (or parametrized fixed-point problem) in one compl...
ABSTRACT. There are presently three distinct q-analogues of the Lagrange inversion problem. By relat...
AbstractWe give a simple combinatorial proof a Langrange inversion theorem for species and derive fr...
AbstractThe classical Lagrange inversion theorem is a concrete, explicit form of the implicit functi...
A pair of simple bivariate inverse series relations are used by embedding machinery to produce seve...
AbstractSuppose β(t) and γ(t) are a pair of compositional inverse formal powerseries. Lagrange inver...
summary:In order to use the well known representation of the Mellin transform as a combination of tw...
AbstractVarious inversion formulae, especially the beautiful generalized Mobius inversion formula, p...
Abstract. In this paper we shall establish a general result involving Dirichlet product of arithmeti...
AbstractAn algorithm that yields every coefficient of the reversed series of a formal power series i...
Abstract. For each natural number n, we characterise the invertible series (under composition) that ...
AbstractThis paper gives a brief exposition of several recent results obtained by the authors concer...
Abstract. We give an algorithm to compute the series expansion for the inverse of a given function. ...
We give an algorithm to compute the series expansion for the inverse of a given function. The algori...
[ACCESS RESTRICTED TO THE UNIVERSITY OF MISSOURI AT REQUEST OF AUTHOR.] In this master's thesis, we ...
I show that the general implicit-function problem (or parametrized fixed-point problem) in one compl...
ABSTRACT. There are presently three distinct q-analogues of the Lagrange inversion problem. By relat...
AbstractWe give a simple combinatorial proof a Langrange inversion theorem for species and derive fr...
AbstractThe classical Lagrange inversion theorem is a concrete, explicit form of the implicit functi...
A pair of simple bivariate inverse series relations are used by embedding machinery to produce seve...
AbstractSuppose β(t) and γ(t) are a pair of compositional inverse formal powerseries. Lagrange inver...
summary:In order to use the well known representation of the Mellin transform as a combination of tw...
AbstractVarious inversion formulae, especially the beautiful generalized Mobius inversion formula, p...
Abstract. In this paper we shall establish a general result involving Dirichlet product of arithmeti...