AbstractThe speeds of convergence of best rational approximations, best polynomial approximations, and the modulus of continuity on the unit disc are compared. We show that, in a Baire category sense, it is expected that subsequences of these approximants will converge at the same rate. Similar problems on the interval [−1, 1] are also examined. A problem raised by P. Turán (J. Approx. Theory29, 1980, 23-89) concerning rational approximation to non-analytically continuable ƒ on the unit circle is negated as an application
AbstractLetEbe a subspace ofC(X) and letR(E)=g/h:g, h∈E; h>0}. We make a simple, yet intriguing obse...
applied to study approximation of ez on a disk rather than an interval. Let E,, be the distance in t...
AbstractThe rate of the best rational approximation and interpolation of a meromorphic function on a...
AbstractThe speeds of convergence of best rational approximations, best polynomial approximations, a...
AbstractA relation between the degree of convergence (in capacity) of Padé approximants and the degr...
AbstractWe investigate the rate of pointwise rational approximation of functions from two classes. T...
AbstractLetxbe a real number in [0, 1], Fnbe the Farey sequence of ordernandρn(x) be the distance be...
We continue investigations of the modified-trigonometric-rational approximations that arise while ac...
The present paper is concerned with the rational approximation of functions holomorphic on a domain ...
Abstract. We study rational approximations of elements of a special class of meromor-phic functions ...
AbstractPadé approximants are a natural generalization ofTaylor polynomials; however instead of poly...
AbstractWe consider the rational approximation of a perturbed exponential function (1)f(z)=u0(z)+u1(...
We study rational approximations of elements of a special class of meromorphic functions which are c...
We consider convergence acceleration of the truncated Fourier series by sequential application of po...
AbstractIt is shown that an approximation of e−x on [0, ∞) by rational functions of degree n cannot ...
AbstractLetEbe a subspace ofC(X) and letR(E)=g/h:g, h∈E; h>0}. We make a simple, yet intriguing obse...
applied to study approximation of ez on a disk rather than an interval. Let E,, be the distance in t...
AbstractThe rate of the best rational approximation and interpolation of a meromorphic function on a...
AbstractThe speeds of convergence of best rational approximations, best polynomial approximations, a...
AbstractA relation between the degree of convergence (in capacity) of Padé approximants and the degr...
AbstractWe investigate the rate of pointwise rational approximation of functions from two classes. T...
AbstractLetxbe a real number in [0, 1], Fnbe the Farey sequence of ordernandρn(x) be the distance be...
We continue investigations of the modified-trigonometric-rational approximations that arise while ac...
The present paper is concerned with the rational approximation of functions holomorphic on a domain ...
Abstract. We study rational approximations of elements of a special class of meromor-phic functions ...
AbstractPadé approximants are a natural generalization ofTaylor polynomials; however instead of poly...
AbstractWe consider the rational approximation of a perturbed exponential function (1)f(z)=u0(z)+u1(...
We study rational approximations of elements of a special class of meromorphic functions which are c...
We consider convergence acceleration of the truncated Fourier series by sequential application of po...
AbstractIt is shown that an approximation of e−x on [0, ∞) by rational functions of degree n cannot ...
AbstractLetEbe a subspace ofC(X) and letR(E)=g/h:g, h∈E; h>0}. We make a simple, yet intriguing obse...
applied to study approximation of ez on a disk rather than an interval. Let E,, be the distance in t...
AbstractThe rate of the best rational approximation and interpolation of a meromorphic function on a...