Some Remarks on Equivalence of Moduli of Smoothness

Its inverse with any constants independent of f is not true in general. Hu and Yu proved that the inverse holds true for splines S with equally spaced knots, thus | m (S, t) p t t| m&1 (S$, t) p tt 2 | m&2 (S", t) p } } } . In this paper, we extend their results to splines with any given knot sequen

In this paper we study relations between moduli of smoothness with the step-weight function . and the best approximation by splines with knots uniformly distributed according to the measure with density 1Â.(x). The direct and converse results are obtained for a class of step-weight functions, contai

The best polynomial approximation is closely related to the Ditzian᎐Totik modulus of smoothness. In 1988, Z. Ditzian and V. Totik gave some equivalences between them and the class of Besov-type spaces B p with 1 F p F ϱ and ␣, s 1 F s F ϱ. We extend these equivalences to the similar Besov-type space

## Abstract We present characterizations of the Besov spaces of generalized smoothness $ B^{\sigma,N}\_{p,q} $ (ℝ^__n__^ ) via approximation and by means of differences. (© 2007 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)