English

Local and Global Analysis of Parametric Solid Sweeps

Computational Geometry 2013-06-03 v1

Abstract

In this work, we propose a detailed computational framework for modelling the envelope of the swept volume, that is the boundary of the volume obtained by sweeping an input solid along a trajectory of rigid motions. Our framework is adapted to the well-established industry-standard brep format to enable its implementation in modern CAD systems. This is achieved via a "local analysis", which covers parametrization and singularities, as well as a "global theory" which tackles face-boundaries, self-intersections and trim curves. Central to the local analysis is the "funnel" which serves as a natural parameter space for the basic surfaces constituting the sweep. The trimming problem is reduced to the problem of surface-surface intersections of these basic surfaces. Based on the complexity of these intersections, we introduce a novel classification of sweeps as either decomposable or non-decomposable. Further, we construct an {\em invariant} function θ\theta on the funnel which efficiently separates decomposable and non-decomposable sweeps. Through a geometric theorem we also show intimate connections between θ\theta, local curvatures and the inverse trajectory used in earlier works as an approach towards trimming. In contrast to the inverse trajectory approach, θ\theta is robust and is the key to a complete structural understanding, and an efficient computation of both, the singular locus and the trim curves, which are central to a stable implementation. Several illustrative outputs of a pilot implementation are included.

Keywords

Cite

@article{arxiv.1305.7351,
  title  = {Local and Global Analysis of Parametric Solid Sweeps},
  author = {Bharat Adsul and Jinesh Machchhar and Milind Sohoni},
  journal= {arXiv preprint arXiv:1305.7351},
  year   = {2013}
}
R2 v1 2026-06-22T00:25:44.926Z