We investigate the asymptotic behaviour of the coefficients in powers of generating functions y (x) that satisfy a relation of the form y = x φ (y)
Let $\sum_{\mathbf{n} \in \mathbb{N}^d} F_{\mathbf{n}} \mathbf{x}^{\mathbf{n}}$ be a multivariate ge...
A new method for computing asymptotics of diagonal coefficients of multivariate generating function
Abstract. We look at the asymptotic behavior of the coefficients of the q-binomial coef-ficients (or...
AbstractThe aim of this paper is to give a bivariate asymptotic expansion of the coefficient ynk = [...
AbstractThe aim of this paper is to give a bivariate asymptotic expansion of the coefficient ynk = [...
[[abstract]]The aim of this thesis is to derive asymptotic approximations to the coefficients of pow...
An asymptotic estimate is given for the coefficients of products of large powers of generating funct...
AbstractWe derive asymptotic estimates for the coefficient of zk in (f(z))n when n→∞ and k is of ord...
In this paper, we investigate certain sums involving the inverse of binomial coefficients. We give t...
The essential purpose of this paper is to obtain further information in regard to the asymptotic rep...
AbstractWe review existing results on the asymptotic approximation of the coefficient of order n of ...
We derive an asymptotic expansion as n → ∞ for a large range of coefficients of (f (z))n, where f(z...
AbstractSuitable transformations on the classical system of orthogonal polynomials lead to polynomia...
We derive an asymptotic expansion as n → ∞ for a large range of coefficients of (f (z))n, where f(z...
AbstractLet A(x) be a formal power series with rapidly growing coefficients and let F(x) be analytic...
Let $\sum_{\mathbf{n} \in \mathbb{N}^d} F_{\mathbf{n}} \mathbf{x}^{\mathbf{n}}$ be a multivariate ge...
A new method for computing asymptotics of diagonal coefficients of multivariate generating function
Abstract. We look at the asymptotic behavior of the coefficients of the q-binomial coef-ficients (or...
AbstractThe aim of this paper is to give a bivariate asymptotic expansion of the coefficient ynk = [...
AbstractThe aim of this paper is to give a bivariate asymptotic expansion of the coefficient ynk = [...
[[abstract]]The aim of this thesis is to derive asymptotic approximations to the coefficients of pow...
An asymptotic estimate is given for the coefficients of products of large powers of generating funct...
AbstractWe derive asymptotic estimates for the coefficient of zk in (f(z))n when n→∞ and k is of ord...
In this paper, we investigate certain sums involving the inverse of binomial coefficients. We give t...
The essential purpose of this paper is to obtain further information in regard to the asymptotic rep...
AbstractWe review existing results on the asymptotic approximation of the coefficient of order n of ...
We derive an asymptotic expansion as n → ∞ for a large range of coefficients of (f (z))n, where f(z...
AbstractSuitable transformations on the classical system of orthogonal polynomials lead to polynomia...
We derive an asymptotic expansion as n → ∞ for a large range of coefficients of (f (z))n, where f(z...
AbstractLet A(x) be a formal power series with rapidly growing coefficients and let F(x) be analytic...
Let $\sum_{\mathbf{n} \in \mathbb{N}^d} F_{\mathbf{n}} \mathbf{x}^{\mathbf{n}}$ be a multivariate ge...
A new method for computing asymptotics of diagonal coefficients of multivariate generating function
Abstract. We look at the asymptotic behavior of the coefficients of the q-binomial coef-ficients (or...
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