Computability on Regular Subsets of Euclidean Space

## Abstract We give an intrinsic characterization of the restrictions of Sobolev $W^{k}\_{p}$ (ℝ^__n__^ ), Triebel–Lizorkin $F^{s}\_{pq}$(ℝ^__n__^ ) and Besov $B^{s}\_{pq}$(ℝ^__n__^ ) spaces to regular subsets of ℝ^__n__^ via sharp maximal functions and local approximations. (© 2006 WILEY‐VCH Verl

Complete L-regularity is internally characterized in terms of separating chains of open L-sets. A possible characterization in terms of normal and separating families of closed L-sets is discussed and it is shown that spaces admitting such families are completely L-regular. The question of whether t

## Abstract We develop some parts of the theory of compact operators from the point of view of computable analysis. While computable compact operators on Hilbert spaces are easy to understand, it turns out that these operators on Banach spaces are harder to handle. Classically, the theory of compac

We bound the spectrum of singularities of functions in the critical Besov spaces, and we show that this result is sharp, in the sense that equality in the bounds holds for quasi-every function of the corresponding Besov space.

We study dynamical systems on the space K E by considering transformations n Ž . Ž . : K E ªK E which are constructed from image source data such as occur in n n the dynamics of the brain. In particular, we establish sufficient conditions for the Ž . existence of invariant measures on K E . Under c