Almost everywhere Convergence of Spline Sequences

Abstract

We prove the analogue of the Martingale Convergence Theorem for polynomial spline sequences. Given a natural number k and a sequence (ti) of knots in [0,1] with multiplicity k-1, we let Pn be the orthogonal projection onto the space of spline polynomials in [0,1] of degree k-1 corresponding to the grid (ti)i=1n. Let X be a Banach space with the Radon-Nikod\'ym property. Let (gn) be a bounded sequence in the Bochner-Lebesgue space L1X [0,1] satisfying gn = Pn ( gn+1 ), n ∈ N . We prove the existence of n ∞ gn(t) in X for almost every t ∈ [0,1]. Already in the scalar valued case X = R the result is new.