On almost everywhere convergence of tensor product spline projections

Abstract

Let d∈ N and f be a function in the Orlicz class L(+L)d-1 defined on the unit cube [0,1]d in Rd. Given partitions 1,…, d of [0,1], we first prove that the orthogonal projection P(1,…,d)(f) onto the space of tensor product splines with arbitrary orders (k1,…, kd) and knots 1,…,d converges to f almost everywhere as the mesh diameters |1|,…, |d| tend to zero. This extends the one-dimensional result in [Passenbrunner and Shadrin, Journal of Approximation Theory, 2014] to arbitrary dimensions. In a second step, we show that this result is optimal, i.e., given any "bigger" Orlicz class X=σ(L)L(+ L)d-1 with an arbitrary function σ tending to zero at infinity, there exists a function ∈ X and partitions of the unit cube such that the orthogonal projections of do not converge almost everywhere.