中文

Approximation by smooth functions with no critical points on separable Banach spaces

泛函分析 2007-05-23 v1 微分几何

摘要

We characterize the class of separable Banach spaces XX such that for every continuous function f:XRf:X\to\mathbb{R} and for every continuous function ϵ:X(0,+)\epsilon:X\to\mathbb(0,+\infty) there exists a C1C^1 smooth function g:XRg:X\to\mathbb{R} for which f(x)g(x)ϵ(x)|f(x)-g(x)|\leq\epsilon(x) and g(x)0g'(x)\neq 0 for all xXx\in X (that is, gg has no critical points), as those Banach spaces XX with separable dual XX^*. We also state sufficient conditions on a separable Banach space so that the function gg can be taken to be of class CpC^p, for p=1,2,...,+p=1,2,..., +\infty. In particular, we obtain the optimal order of smoothness of the approximating functions with no critical points on the classical spaces p(N)\ell_p(\mathbb{N}) and Lp(Rn)L_p(\mathbb{R}^n). Some important consequences of the above results are (1) the existence of {\em a non-linear Hahn-Banach theorem} and (2) the smooth approximation of closed sets, on the classes of spaces considered above.

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引用

@article{arxiv.math/0510603,
  title  = {Approximation by smooth functions with no critical points on separable Banach spaces},
  author = {D. Azagra and M. Jimenez-Sevilla},
  journal= {arXiv preprint arXiv:math/0510603},
  year   = {2007}
}

备注

34 pages