Embedded Spaces of Trigonometric Splines and Their Wavelet Expansion

In this paper, a semi-orthogonal cubic spline wavelet basis of homogeneous Sobolev space H 2 0 (I) is constructed, which turns out to be a basis of the continuous space C 0 (I). At the same time, the orthogonal projections on the wavelet subspaces in H 2 0 (I) are extended to the interpolating opera

We review 28 uniform partitions of 3-space in order to find out which of them have graphs (skeletons) embeddable isometrically (or with scale 2) into some cubic lattice Z n . We also consider some relatives of those 28 partitions, including Archimedean 4-polytopes of Conway-Guy, non-compact uniform

We consider spaces of the form span 1, t, . . . , t n-4 , u 1 (t), u 2 (t), u 3 (t), u 4 (t) , where the functions u i (i = 1, . . . , 4) are algebraic polynomials, or trigonometric or hyperbolic functions. We find intervals [0, α] where we can guarantee that the spaces possess normalized totally po