In mathematics, a Fréchet surface is an equivalence class of parametrized surfaces in a metric space. In other words, a Fréchet surface is a way of thinking about surfaces independently of how they are "written down" (parametrized). The concept is named after the French mathematician Maurice Fréchet.

Definitions

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Let   be a compact 2-dimensional manifold, either closed or with boundary, and let   be a metric space. A parametrized surface in   is a map   that is continuous with respect to the topology on   and the metric topology on   Let   where the infimum is taken over all homeomorphisms   of   to itself. Call two parametrized surfaces   and   in   equivalent if and only if  

An equivalence class   of parametrized surfaces under this notion of equivalence is called a Fréchet surface; each of the parametrized surfaces in this equivalence class is called a parametrization of the Fréchet surface  

Properties

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Many properties of parametrized surfaces are actually properties of the Fréchet surface, that is, of the whole equivalence class, and not of any particular parametrization.

For example, given two Fréchet surfaces, the value of   is independent of the choice of the parametrizations   and   and is called the Fréchet distance between the Fréchet surfaces.

References

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  • Fréchet, M. (1906). "Sur quelques points du calcul fonctionnel". Rend. Circolo Mat. Palermo. 22: 1–72. doi:10.1007/BF03018603. hdl:10338.dmlcz/100655.
  • Zalgaller, V.A. (2001) [1994], "Fréchet surface", Encyclopedia of Mathematics, EMS Press