A succinct introduction to splines, explaining how and why B-splines are used as a basis and how cubic and quadratic splines may be constructed, is followed by brief account of Hermite interpolation and Padé approximations
This book takes readers on a multi-perspective tour through state-of-the-art mathematical developmen...
The aim of this thesis is to develop an algorithm for solving the best approximation problem in the ...
Splines, which were invented by Schoenberg more than fifty years ago [1], constitute an elegant fram...
A succinct introduction to splines, explaining how and why B-splines are used as a basis and how cub...
In a series of three articles, spline approximation is presented from a geodetic point of view. In p...
This survey gives an overview of several fundamental algebraic constructions which arise in the stud...
It is often important in practice to obtain approximate representations of physical data by relative...
This chapter presents an overview of polynomial spline theory, with special emphasis on the B-spline...
This dissertation gives explicit algorithms for constructing multiple types of high dimen-sional 1D ...
The use of spline basis functions in solving least squares approximation problems is investigated. T...
In this thesis, we study properties of cubic and quadratic spline interpolation. First, we define th...
A spline is a thin flexible strip composed of a material such as bamboo or steel that can be bent to...
We present here the definition of Pad´e spline functions, their expressions, and the estimate of the...
• Understanding that splines minimize oscillations by fitting lower-order polynomials to data in a p...
One of the fundamental results in spline interpolation theory is the famous Schoenberg-Whitney Theor...
This book takes readers on a multi-perspective tour through state-of-the-art mathematical developmen...
The aim of this thesis is to develop an algorithm for solving the best approximation problem in the ...
Splines, which were invented by Schoenberg more than fifty years ago [1], constitute an elegant fram...
A succinct introduction to splines, explaining how and why B-splines are used as a basis and how cub...
In a series of three articles, spline approximation is presented from a geodetic point of view. In p...
This survey gives an overview of several fundamental algebraic constructions which arise in the stud...
It is often important in practice to obtain approximate representations of physical data by relative...
This chapter presents an overview of polynomial spline theory, with special emphasis on the B-spline...
This dissertation gives explicit algorithms for constructing multiple types of high dimen-sional 1D ...
The use of spline basis functions in solving least squares approximation problems is investigated. T...
In this thesis, we study properties of cubic and quadratic spline interpolation. First, we define th...
A spline is a thin flexible strip composed of a material such as bamboo or steel that can be bent to...
We present here the definition of Pad´e spline functions, their expressions, and the estimate of the...
• Understanding that splines minimize oscillations by fitting lower-order polynomials to data in a p...
One of the fundamental results in spline interpolation theory is the famous Schoenberg-Whitney Theor...
This book takes readers on a multi-perspective tour through state-of-the-art mathematical developmen...
The aim of this thesis is to develop an algorithm for solving the best approximation problem in the ...
Splines, which were invented by Schoenberg more than fifty years ago [1], constitute an elegant fram...