Add to ORKGA way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an approach employs a (possibly infinite) linear combination of smooth basis functions with coefficients obtained as the unique solution of a minimization problem. While the minimization guarantees the smoothness of the approximant and its derivatives, the constraints represent the interpolating or smoothing conditions at nodes. In the contribution, a special attention is paid to the periodic basis system $exp(-ii kx)$. A 1D numerical example is presented
The issue of constructing periodic smoothing splines has been recently formulated as a controlled tw...
Some results on approximation of periodic functions are extended in two directions: Improving the de...
summary:Following the research of Babuška and Práger, the author studies the approximation power of ...
summary:A way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an...
summary:A way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an...
summary:A way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an...
A way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an approac...
In the paper, we are concerned with some computational aspects of smooth approximation of data. This...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
summary:In the contribution, we are concerned with the exact interpolation of the data at nodes give...
In the contribution, we are concerned with the exact interpolation of the data at nodes given and al...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
summary:In the contribution, we are concerned with the exact interpolation of the data at nodes give...
A family of simple, periodic basis functions with 'built-in' discontinuities are introduced, and the...
AbstractLetWnbe the set of 2π-periodic functions with absolutely continuous (n−1)th derivatives and ...
The issue of constructing periodic smoothing splines has been recently formulated as a controlled tw...
Some results on approximation of periodic functions are extended in two directions: Improving the de...
summary:Following the research of Babuška and Práger, the author studies the approximation power of ...
summary:A way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an...
summary:A way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an...
summary:A way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an...
A way of data approximation called smooth was introduced by Talmi and Gilat in 1977. Such an approac...
In the paper, we are concerned with some computational aspects of smooth approximation of data. This...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
summary:In the contribution, we are concerned with the exact interpolation of the data at nodes give...
In the contribution, we are concerned with the exact interpolation of the data at nodes given and al...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
summary:In the contribution, we are concerned with the exact interpolation of the data at nodes give...
A family of simple, periodic basis functions with 'built-in' discontinuities are introduced, and the...
AbstractLetWnbe the set of 2π-periodic functions with absolutely continuous (n−1)th derivatives and ...
The issue of constructing periodic smoothing splines has been recently formulated as a controlled tw...
Some results on approximation of periodic functions are extended in two directions: Improving the de...
summary:Following the research of Babuška and Práger, the author studies the approximation power of ...