Testing the variety hypothesis
Published: Jul 22, 2025
Last Updated: Jul 22, 2025
Authors:A. Lerario, P. Roos Hoefgeest, M. Scolamiero, A. Tamai
Abstract
Given a probability measure on the unit disk, we study the problem of deciding whether, for some threshold probability, this measure is supported near a real algebraic variety of given dimension and bounded degree. We call this "testing the variety hypothesis". We prove an upper bound on the so-called "sample complexity" of this problem and show how it can be reduced to a semialgebraic decision problem. This is done by studying in a quantitative way the Hausdorff geometry of the space of real algebraic varieties of a given dimension and degree.