Statistical learning on measures: an application to persistence diagrams

Abstract: We consider a binary supervised learning classification problem where instead of having data in a finite-dimensional Euclidean space, we observe measures on a compact space X . Formally, we observe data D N = (µ 1 , Y 1 ), . . . , (µ N , Y N ) where µ i is a measure on X and Y i is a label in {0, 1}. Given a set F of base-classifiers on X , we build corresponding classifiers in the space of measures. We provide upper and lower bounds on the Rademacher complexity of this new class of classifiers that can be exp… Show more