A Geometry Characteristic for Banach Space with $c^1$-Norm

Details A Geometry Characteristic for Banach Space with $c^1$-Norm A Geometry Characteristic for Banach Space with $c^1$-Norm

2011-09-30

arxiv.org/abs/1109.6823v2

Mathematics

Functional Analysis

Scientific paper

Let $E$ be a Banach space with the $c^1$-norm $\|\cdot\|$ in $ E \backslash \{0\}$ and $S(E)=\{e\in E: \|e\|=1\}.$ In this paper, a geometry characteristic for $E$ is presented by using a geometrical construct of $S(E).$ That is, the following theorem holds : the norm of $E$ is of $c^1$ in $ E \backslash \{0\}$ if and only if $S(E)$ is a $c^1$-submanifold of $E,$ with ${\rm codim}S(E)=1.$ The theorem is very clear, however, its proof is non-trivial, which shows an intrinsic connection between the continuous differentiability of the norm $\|\cdot\|$ in $ E \backslash \{0\}$ and differential structure of $S(E).$

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