Local average sampling and reconstruction with fundamental splines of fractional order

Abstract

We analyse sampling and average sampling techniques for fractional spline subspaces of L2(R). Fractional B-splines βσ are extensions of Schoenberg's polynomial splines of integral order to real order σ > -1. We present the interpolation with fundamental splines of fractional order for σ ≥ 1 and the average sampling with fundamental splines of fractional order for σ ≥ 32. Further, we generalise Kramer's lemma in the context of local average sampling.