AN OPTIMAL ALGORITHM FOR ROUNDNESS DETERMINATION ON CONVEX POLYGONS

In tolerancing, the Out-Of-Roundness factor determines the relative circularity of planar shapes. The measurement of concern in this work is the Minimum Radial Separation, as recommended by the American National Standards Institute (ANSI). Here we show that the algorithm given in Le and Lee [6] runs in Theta(n(2)) time even for convex polygons. Furthermore, we present an optimal O(n) time algorithm to compute the Minimum Radial Separation of convex polygons, which represents not only a factor n improvement over the previously best known algorithm, but also a factor of log n improvement over Le and Lee's conjectured complexity for the problem.