Surjectivity of linear operators and semialgebraic global diffeomorphisms

Abstract

We prove that a C∞ semialgebraic local diffeomorphism of Rn with non-properness set having codimension greater than or equal to 2 is a global diffeomorphism if n-1 suitable linear partial differential operators are surjective. Then we state a new analytic conjecture for a polynomial local diffeomorphism of Rn. Our conjecture implies a very known conjecture of Z. Jelonek. We further relate the surjectivity of these operators with the fibration concept and state a general global injectivity theorem for semialgebraic mappings which turns out to unify and generalize previous results of the literature.

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