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The role of Frolov's cubature formula for functions with bounded mixed derivative
We prove upper bounds on the order of convergence of Frolov's cubature
formula for numerical integration in function spaces of dominating mixed
smoothness on the unit cube with homogeneous boundary condition. More
precisely, we study worst-case integration errors for Besov
and Triebel-Lizorkin spaces
and our results treat the whole range of admissible parameters .
In particular, we obtain upper bounds for the difficult the case of small
smoothness which is given for Triebel-Lizorkin spaces
in case with . The presented upper
bounds on the worst-case error show a completely different behavior compared to
"large" smoothness . In the latter case the presented upper bounds
are optimal, i.e., they can not be improved by any other cubature formula. The
optimality for "small" smoothness is open.Comment: 23 page