Distance set explained

In geometry, the distance set of a collection of points is the set of distances between distinct pairs of points. Thus, it can be seen as the generalization of a difference set, the set of distances (and their negations) in collections of numbers.

Several problems and results in geometry concern distance sets, usually based on the principle that a large collection of points must have a large distance set (for varying definitions of "large"):

d

-dimensional space that has Hausdorff dimension larger than

d/2

, the corresponding distance set has nonzero Lebesgue measure. Although partial results are known, the conjecture remains unproven.

d

-dimensional space with the Manhattan distance is exactly

2d

, but this remains unproven.

Distance sets have also been used as a shape descriptor in computer vision.

See also