On the Complexity of Binary Samples

Abstract

Consider a class of binary functions h: X\-1, +1\ on a finite interval X=[0, B]⊂ . Define the sample width of h on a finite subset (a sample) S⊂ X as S(h) x∈ S |h(x)|, where h(x) = h(x) \a≥ 0: h(z)=h(x), x-a≤ z≤ x+a\. Let S be the space of all samples in X of cardinality and consider sets of wide samples, i.e., hypersets which are defined as Aβ, h = \S∈ S: S(h) ≥ β\. Through an application of the Sauer-Shelah result on the density of sets an upper estimate is obtained on the growth function (or trace) of the class \Aβ, h: h∈\, β>0, i.e., on the number of possible dichotomies obtained by intersecting all hypersets with a fixed collection of samples S∈S of cardinality m. The estimate is 2Σi=02 B/(2β)m- i.