Publication Date
8-2016
Abstract
Several different metrics have been proposed to describe distance between intervals and, more generally, between compact sets. In this paper, we show that from the viewpoint of interval computations, the most adequate distance is the Hausdorff distance dH(A,A') -- the smallest value ε > 0 for which every element a from the set A is ε-close to some element a' from the ser A', and every element a' from the set A' is ε-close to some element a of the set A.
Comments
Technical Report: UTEP-CS-16-58