{"record_type":"pith_number_record","schema_url":"https://pith.science/schemas/pith-number/v1.json","pith_number":"pith:2018:7LUM665MG3AP4EWCOVDTKRZHVJ","short_pith_number":"pith:7LUM665M","schema_version":"1.0","canonical_sha256":"fae8cf7bac36c0fe12c27547354727aa7c612d22f4b24ac005b0d2a27d43cad7","source":{"kind":"arxiv","id":"1811.07587","version":2},"attestation_state":"computed","paper":{"title":"Smooth approximations without critical points of continuous mappings between Banach spaces, and diffeomorphic extractions of sets","license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","headline":"","cross_cats":["math.DG"],"primary_cat":"math.FA","authors_text":"Daniel Azagra, Miguel Garc\\'ia-Bravo, Tadeusz Dobrowolski","submitted_at":"2018-11-19T10:08:31Z","abstract_excerpt":"Let $E$, $F$ be separable Hilbert spaces, and assume that $E$ is infinite-dimensional. We show that for every continuous mapping $f:E\\to F$ and every continuous function $\\varepsilon: E\\to (0, \\infty)$ there exists a $C^{\\infty}$ mapping $g:E\\to F$ such that $\\|f(x)-g(x)\\|\\leq\\varepsilon(x)$ and $Dg(x):E\\to F$ is a surjective linear operator for every $x\\in E$. We also provide a version of this result where $E$ can be replaced with a Banach space from a large class (including all the classical spaces with smooth norms, such as $c_0$, $\\ell_p$ or $L^{p}$, $1