Spirals are surprisingly common in science, nature, physics, astronomy, flora and fauna, and the arts. In Cartesian coordinates they are typically transcendental functions, which makes the evaluation on Cartesian grids an inefficient process. We propose a construction scheme for piecewise circular approximations. The algorithm is convergent and consists of generating center coordinates and radii for quarter circles given an arbitrary monotone polynomial, exponential, or logarithmic function in polar coordinates. Evaluating quarter circles as well as generating the parameters can be done incrementally with few integer operations, thus, the algorithm is fast and stable
In computer graphics one often needs to convert a given Bézier curve to a polygon (i.e., to a sequen...
AbstractTwo-dimensional digitized curves are often approximated by some piecewise linear or high-ord...
In numerous instances, accurate algorithms for approximating the original geometry is required. One ...
Spirals are surprisingly common in science, nature, physics, astronomy, flora and fauna, and the art...
Spirals are surprisingly common in science, nature, physics, astronomy, flora and fauna, and the art...
Scan-conversion of Archimedes' spiral (a straight line in polar coordinates) is investigated. It is ...
Scan-conversion of Archimedes' spiral (a straight line in polar coordinates) is investigated. It is ...
The approximation of a golden logarithmic spiral by quarter circles is well known. Starting from thi...
Mathematically, circles are represented by trigonometric parametric equations and im- plicit equatio...
AbstractWe present a simple method for polynomial approximation of circular arcs and helices by expr...
AbstractA planar cubic Bézier curve that is a spiral, i.e., its curvature varies monotonically, does...
This paper presents an alternative procedure of approximating the graph of a certain family of polar...
In this paper the approximation of circular arcs by parametric polynomial curves is studied. If the ...
Communicated by (Name of Editor) Several constructions for piecewise circular approximations to elli...
A complete MAPLE procedure is designed to effectively implement an algorithm for approximating trigo...
In computer graphics one often needs to convert a given Bézier curve to a polygon (i.e., to a sequen...
AbstractTwo-dimensional digitized curves are often approximated by some piecewise linear or high-ord...
In numerous instances, accurate algorithms for approximating the original geometry is required. One ...
Spirals are surprisingly common in science, nature, physics, astronomy, flora and fauna, and the art...
Spirals are surprisingly common in science, nature, physics, astronomy, flora and fauna, and the art...
Scan-conversion of Archimedes' spiral (a straight line in polar coordinates) is investigated. It is ...
Scan-conversion of Archimedes' spiral (a straight line in polar coordinates) is investigated. It is ...
The approximation of a golden logarithmic spiral by quarter circles is well known. Starting from thi...
Mathematically, circles are represented by trigonometric parametric equations and im- plicit equatio...
AbstractWe present a simple method for polynomial approximation of circular arcs and helices by expr...
AbstractA planar cubic Bézier curve that is a spiral, i.e., its curvature varies monotonically, does...
This paper presents an alternative procedure of approximating the graph of a certain family of polar...
In this paper the approximation of circular arcs by parametric polynomial curves is studied. If the ...
Communicated by (Name of Editor) Several constructions for piecewise circular approximations to elli...
A complete MAPLE procedure is designed to effectively implement an algorithm for approximating trigo...
In computer graphics one often needs to convert a given Bézier curve to a polygon (i.e., to a sequen...
AbstractTwo-dimensional digitized curves are often approximated by some piecewise linear or high-ord...
In numerous instances, accurate algorithms for approximating the original geometry is required. One ...