Affiliation:
1. School of Mathematical Sciences, Inner Mongolia University, Hohhot 010021, China
Abstract
Let X,Y be two Banach spaces and f:X→Y be a standard coarse isometry. In this paper, we first show a sufficient and necessary condition for the coarse left-inverse operator of general Banach spaces to admit a linearly isometric right inverse. Furthermore, by using the well-known simultaneous extension operator, we obtain an asymptotical stability result when Y is a space of continuous functions. In addition, we also prove that every coarse left-inverse operator does admit a linear isometric right inverse without other assumptions when Y is a Lp(1<p<∞) space, or both X and Y are finite dimensional spaces of the same dimension. Making use of the results mentioned above, we generalize several results of isometric embeddings and give a stability result of coarse isometries between Banach spaces.
Funder
National Natural Science Foundation of China
Research Program of Science at Universities of Inner Mongolia Autonomous Region
Fund Project for Central Leading Local Science and Technology Development
Reference36 articles.
1. Sur les transformations isométriques d’espaces vectoriels normés;Mazur;CR Acad. Sci. Paris,1932
2. On non linear isometric embeddings of normed linear spaces;Figiel;Bull. Acad. Polon. Sci. Math. Astro. Phys.,1968
3. Lipschitz-free Banach spaces;Godefroy;Stud. Math.,2003
4. Linearization of isometric embedding on Banach spaces;Zhou;Stud. Math.,2015
5. On preturbed metric-preserved mappings and their stability characterizations;Cheng;J. Funct. Aanl.,2014