Approximating Gromov-Hausdorff Distance in Euclidean Space

Abstract

The Gromov-Hausdorff distance (dGH) proves to be a useful distance measure between shapes. In order to approximate dGH for compact subsets X,Y⊂Rd, we look into its relationship with dH,iso, the infimum Hausdorff distance under Euclidean isometries. As already known for dimension d≥ 2, the dH,iso cannot be bounded above by a constant factor times dGH. For d=1, however, we prove that dH,iso≤54dGH. We also show that the bound is tight. In effect, this gives rise to an O(nn)-time algorithm to approximate dGH with an approximation factor of (1+14).