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Orthogonal projectors onto spaces of periodic splines

The main result of this paper is a proof that for any integrable function $f$ on the torus, any sequence of its orthogonal projections $(\widetilde{P}_n f)$ onto periodic spline spaces with arbitrary knots $\widetildeΔ_n$ and arbitrary polynomial degree converges to $f$ almost everywhere with respect to the Lebesgue measure, provided the mesh diameter $|\widetildeΔ_n|$ tends to zero. We also give a proof of the fact that the operators $\widetilde{P}_n$ are bounded on $L^\infty$ independently of the knots $\widetildeΔ_n$.

preprint2016arXivOpen access
Markus Passenbrunner
math.FA
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Markus Passenbrunner

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