Approximation of General Smooth Convex Bodies

We present a fairly general method for constructing classes of functions of finite scale-sensitive dimension (the scale-sensitive dimension is a generalization of the Vapnik Chervonenkis dimension to realvalued functions). The construction is as follows: start from a class F of functions of finite V

Representation of real regions by corresponding digital pictures causes an inherent loss of information. There are infinitely many different real regions with an identical corresponding digital picture. So, there are limitations in the reconstruction of the originals and their properties from digita

## Abstract A real locally convex space is said to be __convenient__ if it is separated, bornological and Mackey‐complete. These spaces serve as underlying objects for a whole theory of differentiation and integration (see [4]) upon which infinite dimensional differential geometry is based (cf. [8]

In this paper we show that the best approximation of a convex function by convex algebraic polynomials in \(L_{p}, 1 \leqslant p<x\), is \(O\left(n^{-2 / p}\right)\). 1993 Academic Press. Inc.

We extend to the general, not necessarily centrally symmetric setting a number of basic results of local theory which were known before for centrally symmetric bodies and were using very essentially the symmetry in their proofs. Some of these extensions look surprising. The main additional tool is a