Author:
Alberto De Bernardi Carlo,Veselý Libor
Abstract
Abstract
By a tiling of a topological linear space
X, we mean a covering of
X by at least two closed convex sets, called
tiles, whose nonempty interiors are pairwise
disjoint. Study of tilings of infinite dimensional spaceswas initiated in the
1980's with pioneer papers by V. Klee. We prove some general properties of tilings
of locally convex spaces, and then apply these results to study the existence of
tilings of normed and Banach spaces by tiles possessing
certain smoothness or rotundity properties. For a Banach space
X, our main results are the following.
(i)
X admits no tiling
by Fréchet smooth bounded tiles.
(ii)
If X is locally uniformly rotund (LUR),
it does not admit any tiling by
balls.
(iii)
On the other hand, some spaces, г
uncountable, do admit a tiling by pairwise
disjoint LUR bounded tiles.
Publisher
Canadian Mathematical Society
Cited by
5 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献
1. Regularity and Stability for a Convex Feasibility Problem;Set-Valued and Variational Analysis;2021-09-03
2. Normal and starlike tilings in separable Banach spaces;Journal of Mathematical Analysis and Applications;2021-08
3. A note on point-finite coverings by balls;Proceedings of the American Mathematical Society;2021-05-11
4. A variational approach to the alternating projections method;Journal of Global Optimization;2021-04-23
5. Star-finite coverings of Banach spaces;Journal of Mathematical Analysis and Applications;2020-11