https://hal.inria.fr/inria-00509985Cazals, FrédéricFrédéricCazalsiMAGIS - Models, Algorithms and Geometry for Computer Generated Image Graphics - GRAVIR - IMAG - Laboratoire d'informatique GRAphique, VIsion et Robotique de Grenoble - UJF - Université Joseph Fourier - Grenoble 1 - Inria - Institut National de Recherche en Informatique et en Automatique - INPG - Institut National Polytechnique de Grenoble - CNRS - Centre National de la Recherche Scientifique - Inria Grenoble - Rhône-Alpes - Inria - Institut National de Recherche en Informatique et en AutomatiqueRamkumar, GdGdRamkumarComputer Science Department [Stanford] - Stanford UniversityAlgorithms for Computing Intersection and Union of Toleranced Polygons With ApplicationsHAL CCSD1997[INFO.INFO-GR] Computer Science [cs]/Graphics [cs.GR]Evasion, Team2010-08-19 12:12:022023-03-15 08:53:372010-08-19 13:56:23enJournal articlesapplication/pdf1Since mechanical operations are performed only up to a certain precision, the geometry of parts involved in real life products is never known precisely. But if tolerance models for specifying acceptable variations have received a substantial attention, operations on toleranced objects have not been studied extensively. That is the reason why we address in this paper the computation of the union and the intersection of toleranced simple polygons, under a simple and already known tolerance model. Firstly, we provide a practical and efficient algorithm that stores in an implicit data structure the information necessary to answer a request for specific values of the tolerances without performing a computation from scratch. If the polygons are of sizes m and n, and s is the number of intersections between edges occurring for all the combinations of tolerance values, the pre-processed data structure takes O(s) space and the algorithm that computes a union/intersection from it takes O((n+m) log s+ k ′ +k log k) time where k is the number of vertices of the union/intersection and k k ′ s. Although the algorithm is not output sensitive, we show that the expectations of k and k ′ remain within a constant factor , a function of the input geometry. Secondly, we define and study the stability of union or intersection features. Thirdly, we list interesting applications of the algorithms related to feasibility of assembly and assembly sequencing of real assemblies.