Системы промышленной автоматизации и интеграция. Представление данных о продукции и обмен данными. Часть 42. Интегрированные родовые ресурсы. Геометрическое и топологическое представление
Название (англ.):
Industrial automation systems and integration -- Product data representation and exchange -- Part 42: Integrated generic resource: Geometric and topological representation
Описание (англ.):
ISO 10303-42:2003 specifies the resource constructs for the explicit geometric and topological representation of the shape of a product. The scope is determined by the requirements for the explicit representation of an ideal product model; tolerances and implicit forms of representation in terms of features are out of scope. The geometry in clause 4 and the topology in clause 5 are available for use independently and are also extensively used by the various forms of geometric shape model in clause 6. In addition, ISO 10303-42:2003 specifies specialisations of the concepts of representation where the elements of representation are geometric. The following are within the scope of the geometry schema: definition of points, vectors, parametric curves and parametric surfaces; definition of finite volumes with internal parametrisation; definition of transformation operators; points defined directly by their coordinate values or in terms of the parameters of an existing curve or surface; definition of conic curves and elementary surfaces; definition of curves defined on a parametric surface; definition of general parametric spline curves, surfaces and volumes; definition of point, curve and surface replicas; definition of offset curves and surfaces; definition of intersection curves. The following are outside the scope of ISO 10303-42:2003: all other forms of procedurally defined curves and surfaces; curves and surfaces which do not have a parametric form of representation; any form of explicit representation of a ruled surface. NOTE For a ruled surface the geometry is critically dependent upon the parametrisation of the boundary curves and the method of associating pairs of points on the two curves. A ruled surface with B-spline boundary curves can however be exactly represented by the B-spline surface entity