Approximating mixed H\"older functions using random samples

Abstract

Suppose f : [0,1]2 → R is a (c,α)-mixed H\"older function that we sample at l points X1,…,Xl chosen uniformly at random from the unit square. Let the location of these points and the function values f(X1),…,f(Xl) be given. If l c1 n 2 n, then we can compute an approximation f such that \|f - f \|L2 = O(n-α 3/2 n), with probability at least 1 - n2 -c1, where the implicit constant only depends on the constants c > 0 and c1 > 0.