A passive approximation problem is formulated where the target function is an arbitrary complex-valued continuous function defined on an approximation domain consisting of a finite union of closed and bounded intervals on the real axis. The norm used is a weighted L p -norm where 1 ≤ p ≤ ∞. The approximating functions are Herglotz functions generated by a measure with Holder continuous density in an arbitrary neighborhood of the approximation domain. Hence, the imaginary and the real parts of the approximating functions are Holder continuous functions given by the density of the measure and its Hilbert transform, respectively. In practice, it is useful to employ finite B-spline expansions to represent the generating measure. The correspondi...
In this paper we study the theoretical limits of finite constructive convex approximations of a give...
In this paper, we derive conditions for best uniform approximation by fixed knots polynomial splines...
Approximation of a smooth function f on a rectangular domain Ω⊂El by a tensor product of splines of ...
A passive approximation problem is formulated where the target function is an arbitrary complex valu...
The set of quasi-Herglotz functions is introduced as a natural extension of the convex cone of Hergl...
We introduce the set of quasi-Herglotz functions and demonstrate that it has properties useful in th...
AbstractA characterization of the best L1-approximation to a continuous function by classes of fixed...
This report deals with approximation of a given scattered univariate or bivariate data set that poss...
We develop and analyze a framework for two-stage methods with EB-splines, applicable to continuous a...
The classical Remez algorithm was developed for constructing the best polynomial approximations for ...
The talk deals with the conditional minimization problem, which generalizes several approximation pr...
In this paper necessary and sufficient optimality conditions for uniform approximation of continuous...
AbstractGiven a monotone or convex function on a finite interval we construct splines of arbitrarily...
Following work by Atteia, Laurent, Bezhaev and Vasilenko, we formulate the problems of constrained s...
AbstractAn algorithm is developed which computes strict approximations in subspaces of spline functi...
In this paper we study the theoretical limits of finite constructive convex approximations of a give...
In this paper, we derive conditions for best uniform approximation by fixed knots polynomial splines...
Approximation of a smooth function f on a rectangular domain Ω⊂El by a tensor product of splines of ...
A passive approximation problem is formulated where the target function is an arbitrary complex valu...
The set of quasi-Herglotz functions is introduced as a natural extension of the convex cone of Hergl...
We introduce the set of quasi-Herglotz functions and demonstrate that it has properties useful in th...
AbstractA characterization of the best L1-approximation to a continuous function by classes of fixed...
This report deals with approximation of a given scattered univariate or bivariate data set that poss...
We develop and analyze a framework for two-stage methods with EB-splines, applicable to continuous a...
The classical Remez algorithm was developed for constructing the best polynomial approximations for ...
The talk deals with the conditional minimization problem, which generalizes several approximation pr...
In this paper necessary and sufficient optimality conditions for uniform approximation of continuous...
AbstractGiven a monotone or convex function on a finite interval we construct splines of arbitrarily...
Following work by Atteia, Laurent, Bezhaev and Vasilenko, we formulate the problems of constrained s...
AbstractAn algorithm is developed which computes strict approximations in subspaces of spline functi...
In this paper we study the theoretical limits of finite constructive convex approximations of a give...
In this paper, we derive conditions for best uniform approximation by fixed knots polynomial splines...
Approximation of a smooth function f on a rectangular domain Ω⊂El by a tensor product of splines of ...