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Reaching a goal with directional uncertainty

Mark de Berg, Leonidas Guibas, Dan Halperin, Mark Overmars, Otfried Schwarzkopf, Micha Sharir, Monique Teillaud

Year
1994
Citations
5

Abstract

We study two problems related to planar motion planning for robots with imperfect control, where, if the robot starts a linear movement in a certain commanded direction, we only know that its actual movement will be conned in a cone of angle centered around the specied direction.
\nFirst, we consider a single goal region, namely the "region at infinity", and a set of polygonal obstacles, modeled as a set S of n line segments. We are interested in the region R(S) from where we can reach infinity with a directional uncertainty of . We prove that the maximum complexity of R(S) is O(n=5). Second, we consider a collection of k polygonal goal regions of total complexity m, but without any obstacles. Here we prove an O(k3m) bound on the complexity of the region from where we can reach a goal region with a directional uncertainty of . For both situations we also prove lower bounds on the maximum complexity, and we give ecient algorithms for computing the regions.

Keywords

InfinityImperfectSet (abstract data type)PlanarLine segmentMathematicsRobotUpper and lower boundsTime complexityMotion planning

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