Add to ORKGWe describe a method to create optimal linear spline approximations to arbitrary functions of one or two variables, given as scattered data without known connectivity. We start with an initial approximation consisting of a fixed number of vertices and improve this approximation by choosing different vertices, governed by a simulated annealing algorithm. In the case of one variable, the approximation is defined by line segments; in the case of two variables, the vertices are connected to define a Delaunay triangulation of the selected subset of sites in the plane. In a second version of this algorithm, specifically designed for the bivariate case, we choose vertex sets and also change the triangulation to achieve both optimal vertex placemen...
We present a method for the construction of hierarchies of single-valued functions in one, two, and ...
We discuss spline refinement methods that approximate multi-valued data defined over one, two, and t...
We present an efficient method to automatically compute a smooth approximation of large functional s...
We describe a method to create optimal linear spline approximations to arbitrary functions of one or...
We describe the algorithms and data structures used for optimizing linear spline approximations of b...
We present a method for the hierarchical approximation of functions in one, two, or three variables ...
We present a method for the hierarchical approximation of functions in one, two, or three variables ...
In this paper we present a new technique for surface reconstruction of digitized models in three dim...
This paper describes a fast algorithm for scattered data interpolation and approximation. Multilevel...
Scattered data collected at sample points may be used to determine simple functions to best fit the ...
We present a new scattered data fitting method, where local approximating polynomials are directly e...
We present an efficient method to automatically compute a smooth approximation of large functional s...
This paper describes a fast algorithm for scattered data interpolation and approximation. Multilevel...
We discuss spline refinement methods that approximate multi-valued data defined over one, two, and t...
We discuss spline refinement methods that approximate multi-valued data defined over one, two, and t...
We present a method for the construction of hierarchies of single-valued functions in one, two, and ...
We discuss spline refinement methods that approximate multi-valued data defined over one, two, and t...
We present an efficient method to automatically compute a smooth approximation of large functional s...
We describe a method to create optimal linear spline approximations to arbitrary functions of one or...
We describe the algorithms and data structures used for optimizing linear spline approximations of b...
We present a method for the hierarchical approximation of functions in one, two, or three variables ...
We present a method for the hierarchical approximation of functions in one, two, or three variables ...
In this paper we present a new technique for surface reconstruction of digitized models in three dim...
This paper describes a fast algorithm for scattered data interpolation and approximation. Multilevel...
Scattered data collected at sample points may be used to determine simple functions to best fit the ...
We present a new scattered data fitting method, where local approximating polynomials are directly e...
We present an efficient method to automatically compute a smooth approximation of large functional s...
This paper describes a fast algorithm for scattered data interpolation and approximation. Multilevel...
We discuss spline refinement methods that approximate multi-valued data defined over one, two, and t...
We discuss spline refinement methods that approximate multi-valued data defined over one, two, and t...
We present a method for the construction of hierarchies of single-valued functions in one, two, and ...
We discuss spline refinement methods that approximate multi-valued data defined over one, two, and t...
We present an efficient method to automatically compute a smooth approximation of large functional s...