A geometric approach to shortest bounded curvature paths
Abstract
Consider two elements in the tangent bundle of the Euclidean plane (x,X),(y,Y)∈ T R2. In this work we address the problem of characterizing the paths of bounded curvature and minimal length starting at x, finishing at y and having tangents at these points X and Y respectively. This problem was first investigated in the late 50's by Lester Dubins. In this note we present a constructive proof of Dubins' result giving special emphasis on the geometric nature of this problem.
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