CGAL 4.6.1 - 3D Spherical Geometry Kernel
|
Concepts | |
concept | AlgebraicKernelForSpheres::CompareX |
concept | AlgebraicKernelForSpheres::CompareXY |
concept | AlgebraicKernelForSpheres::CompareXYZ |
concept | AlgebraicKernelForSpheres::CompareY |
concept | AlgebraicKernelForSpheres::CompareZ |
concept | AlgebraicKernelForSpheres::ConstructPolynomial_1_3 |
concept | AlgebraicKernelForSpheres::ConstructPolynomialForSpheres_2_3 |
concept | AlgebraicKernelForSpheres::ConstructPolynomialsForLines_3 |
concept | AlgebraicKernelForSpheres::Polynomial_1_3 |
Concept to represent trivariate polynomials of degree 1 whose coefficients are of a type that is a model of the concept RingNumberType . More... | |
concept | AlgebraicKernelForSpheres::PolynomialForSpheres_2_3 |
Concept to represent trivariate polynomials of degree up to 2 capable of storing equations of spheres, whose center's coordinates, as well as the square of the radius, are of a type that is a model of the concept FieldNumberType . More... | |
concept | AlgebraicKernelForSpheres::PolynomialsForCircles_3 |
Concept to represent a system of polynomials on FieldNumberType capable of storing equations of circles. More... | |
concept | AlgebraicKernelForSpheres::PolynomialsForLines_3 |
Concept to represent a system of polynomials on FieldNumberType capable of storing equations of lines. More... | |
concept | AlgebraicKernelForSpheres::RootForSpheres_2_3 |
Concept to represent the roots of a system of three equations of degree 2 in three variables x , y and z that are models of concept AlgebraicKernelForSpheres::PolynomialForSpheres_2_3 . More... | |
concept | AlgebraicKernelForSpheres::SignAt |
concept | AlgebraicKernelForSpheres::Solve |
concept | AlgebraicKernelForSpheres::XCriticalPoints |
concept | AlgebraicKernelForSpheres::YCriticalPoints |
concept | AlgebraicKernelForSpheres::ZCriticalPoints |
concept | AlgebraicKernelForSpheres |
The AlgebraicKernelForSpheres concept is meant to provide the curved kernel with all the algebraic functionalities required for the manipulation of spheres, circles, and circular arcs in 3D. More... | |