On a weak Jelonek's real Jacobian Conjecture in n
Abstract
Let Y:nn be a polynomial local diffeomorphism and let SY denote the set of not proper points of Y. The Jelonek's real Jacobian Conjecture states that if (SY)≥2, then Y is bijective. We prove a weak version of such conjecture establishing the sufficiency of a necessary condition for bijectivity. Furthermore, we generalize our result on bijectivity to semialgebraic local diffeomorphisms.
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