Geometry of 3D Environments and Sum of Squares Polynomials

November 22, 2016 Β· Declared Dead Β· πŸ› Robotics: Science and Systems

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Authors Amir Ali Ahmadi, Georgina Hall, Ameesh Makadia, Vikas Sindhwani arXiv ID 1611.07369 Category math.OC: Optimization & Control Cross-listed cs.CG, cs.CV, cs.GR Citations 27 Venue Robotics: Science and Systems Last Checked 3 months ago
Abstract
Motivated by applications in robotics and computer vision, we study problems related to spatial reasoning of a 3D environment using sublevel sets of polynomials. These include: tightly containing a cloud of points (e.g., representing an obstacle) with convex or nearly-convex basic semialgebraic sets, computation of Euclidean distances between two such sets, separation of two convex basic semalgebraic sets that overlap, and tight containment of the union of several basic semialgebraic sets with a single convex one. We use algebraic techniques from sum of squares optimization that reduce all these tasks to semidefinite programs of small size and present numerical experiments in realistic scenarios.
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