Vapnik-Chervonenkis Dimension of Axis-Parallel Cuts

Abstract

The Vapnik-Chervonenkis (VC) dimension of the set of half-spaces of Rd with frontiers parallel to the axes is computed exactly. It is shown that it is much smaller than the intuitive value of d. A good approximation based on the Stirling's formula proves that it is more likely of the order log\2(d). This result may be used to evaluate the performance of classifiers or regressors based on dyadic partitioning of Rd for instance. Algorithms using axis-parallel cuts to partition Rd are often used to reduce the computational time of such estimators when d is large.