Let P (z) and Q(y) be polynomials of the same degree k ≥ 1 in the complex variables z and y, respectively. In this extended abstract we study the non-linear functional equation P (z) = Q(y(z)), where y(z) is restricted to be analytic in a neighborhood of z = 0. We provide sufficient conditions to ensure that all the roots of Q(y) are contained within the range of y(z) as well as to have y(z) = z as the unique analytic solution of the non-linear equation. Our results are motivated from uniqueness considerations of polynomial canonical representations of the phase or amplitude terms of oscillatory integrals encountered in the asymptotic analysis of the coefficients of mixed powers and multivariable generating functions via saddle-point meth...
AbstractIn the paper [J. Ritt, Prime and composite polynomials, Trans. Amer. Math. Soc. 23 (1922) 51...
summary:We study the uniqueness of entire functions which share a polynomial with their linear diffe...
Abstract. In the paper we deal with the uniqueness of meromorphic functions when two non-linear diff...
Let $P(z)$ and $Q(y)$ be polynomials of the same degree $k \geq 1$ in the complex variables $z$ and ...
AbstractWe define the concept of a polynomial function from Zn to Zm, which is a generalization of t...
AbstractFor any univariate polynomial with coefficients in a differential field of characteristic ze...
AbstractLet c be a linear functional defined by its moments c(xi)=ci for i=0,1,…. We proved that the...
summary:The motivation of this paper is to study the uniqueness of meromorphic functions sharing a n...
AbstractLet f be a nonconstant entire function, k and q be positive integers satisfying k>q, and let...
Given an infinite sequence of positive integers A, we prove that for every nonnegative integer k the...
AbstractLet {pk(x;q)} be any system of the q-classical orthogonal polynomials, and let ϱ be the corr...
Dedicated to the 100 birth anniversary of I. N. Vekua Abstract. We study the widest possible general...
Abstract. Using the notion of weighted sharing of values we study the uniqueness of meromorphic func...
AbstractIn this paper we investigate the following “polynomial moment problem”: for a given complex ...
Abstract. The number of zeroes of the restriction of a given polynomial to the trajectory of a polyn...
AbstractIn the paper [J. Ritt, Prime and composite polynomials, Trans. Amer. Math. Soc. 23 (1922) 51...
summary:We study the uniqueness of entire functions which share a polynomial with their linear diffe...
Abstract. In the paper we deal with the uniqueness of meromorphic functions when two non-linear diff...
Let $P(z)$ and $Q(y)$ be polynomials of the same degree $k \geq 1$ in the complex variables $z$ and ...
AbstractWe define the concept of a polynomial function from Zn to Zm, which is a generalization of t...
AbstractFor any univariate polynomial with coefficients in a differential field of characteristic ze...
AbstractLet c be a linear functional defined by its moments c(xi)=ci for i=0,1,…. We proved that the...
summary:The motivation of this paper is to study the uniqueness of meromorphic functions sharing a n...
AbstractLet f be a nonconstant entire function, k and q be positive integers satisfying k>q, and let...
Given an infinite sequence of positive integers A, we prove that for every nonnegative integer k the...
AbstractLet {pk(x;q)} be any system of the q-classical orthogonal polynomials, and let ϱ be the corr...
Dedicated to the 100 birth anniversary of I. N. Vekua Abstract. We study the widest possible general...
Abstract. Using the notion of weighted sharing of values we study the uniqueness of meromorphic func...
AbstractIn this paper we investigate the following “polynomial moment problem”: for a given complex ...
Abstract. The number of zeroes of the restriction of a given polynomial to the trajectory of a polyn...
AbstractIn the paper [J. Ritt, Prime and composite polynomials, Trans. Amer. Math. Soc. 23 (1922) 51...
summary:We study the uniqueness of entire functions which share a polynomial with their linear diffe...
Abstract. In the paper we deal with the uniqueness of meromorphic functions when two non-linear diff...