Large data limit for a phase transition model with the p-Laplacian on point clouds

Abstract

The consistency of a nonlocal anisotropic Ginzburg-Landau type functional for data classification and clustering is studied. The Ginzburg-Landau objective functional combines a double well potential, that favours indicator valued function, and the p-Laplacian, that enforces regularity. Under appropriate scaling between the two terms minimisers exhibit a phase transition on the order of ε=εn where n is the number of data points. We study the large data asymptotics, i.e. as n ∞, in the regime where εn 0. The mathematical tool used to address this question is -convergence. In particular, it is proved that the discrete model converges to a weighted anisotropic perimeter.