AbstractThe Talmi and Gilat variational approach to the interpolation problem in arbitrary dimension is presented together with the corresponding physical model. The connection of this approach to some known spline methods is demonstrated and new interpolation functions are derived for one-, two- and three-dimensional cases. They are designed to be flexible through the use of meaningful parameters and to give good approximations of both the function itself and its derivatives as well
summary:Interpolation on finite elements usually occurs in a Hilbert space setting, which means that...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
Several different procedures are presented to produce smooth interpolating curves on the two-sphere ...
AbstractThe Talmi and Gilat variational approach to the interpolation problem in arbitrary dimension...
In this paper we give an overview of the variational approach to interpolation. Our particular inter...
There are two grounds the spline theory stems from -- the algebraic one (where splines are understoo...
Data measuring and further processing is the fundamental activity in all branches of science and tec...
summary:We study the problem of construction of the smooth interpolation formula presented as the mi...
In this paper, we discuss and develop several one-dimensional interpolation techniques. Interpolatio...
In this paper we consider the problem of developing a variational theory for interpolation by radial...
AbstractIn this paper we first revisit a classical problem of computing variational splines. We prop...
Lagrangian interpolation is a classical way to approximate general functions by finite sums of well c...
AbstractAn algorithm and the corresponding computer program for solution of the scattered data inter...
AbstractThis paper is concerned with interpolation of real functions on compact intervals by nonline...
Závoti (2002) presented the mathematical description of the interpolation method especially for mode...
summary:Interpolation on finite elements usually occurs in a Hilbert space setting, which means that...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
Several different procedures are presented to produce smooth interpolating curves on the two-sphere ...
AbstractThe Talmi and Gilat variational approach to the interpolation problem in arbitrary dimension...
In this paper we give an overview of the variational approach to interpolation. Our particular inter...
There are two grounds the spline theory stems from -- the algebraic one (where splines are understoo...
Data measuring and further processing is the fundamental activity in all branches of science and tec...
summary:We study the problem of construction of the smooth interpolation formula presented as the mi...
In this paper, we discuss and develop several one-dimensional interpolation techniques. Interpolatio...
In this paper we consider the problem of developing a variational theory for interpolation by radial...
AbstractIn this paper we first revisit a classical problem of computing variational splines. We prop...
Lagrangian interpolation is a classical way to approximate general functions by finite sums of well c...
AbstractAn algorithm and the corresponding computer program for solution of the scattered data inter...
AbstractThis paper is concerned with interpolation of real functions on compact intervals by nonline...
Závoti (2002) presented the mathematical description of the interpolation method especially for mode...
summary:Interpolation on finite elements usually occurs in a Hilbert space setting, which means that...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
Several different procedures are presented to produce smooth interpolating curves on the two-sphere ...