David Krieg, J. Vybiral,
"New Lower Bounds for the Integration of Periodic Functions"
, in Journal of Fourier Analysis and Applications, Vol. 29, Nummer 4, (41), 2023
Original Titel:
New Lower Bounds for the Integration of Periodic Functions
Sprache des Titels:
Englisch
Original Kurzfassung:
We study the integration problem on Hilbert spaces of (multivariate) periodic functions.The standard technique to prove lower bounds for the error of quadrature rules uses bump functions and the pigeon hole principle. Recently, several new lower bounds have been obtained using a different technique which exploits the Hilbert space structure and a variant of the Schur product theorem. The purpose of this paper is to (a) survey the new proof technique, (b) show that it is indeed superior to the bump-function technique, and (c) sharpen and extend the results from the previous papers.