It is shown that every global Nash subvariety is Nash isomorphic to a connected component of an algebraic variety that, in the compact case, can be chosen with only two connected components arbitrarily near each other. Some examples which state the limits of the results are given.

A note on global Nash subvarieties and Artin-Mazur Theorem

TANCREDI, Alessandro;
2004

Abstract

It is shown that every global Nash subvariety is Nash isomorphic to a connected component of an algebraic variety that, in the compact case, can be chosen with only two connected components arbitrarily near each other. Some examples which state the limits of the results are given.
2004
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11391/16309
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