Foliations and Polynomial Diffeomorphisms of R3

Abstract

Let Y=(f,g,h):R3 R3 be a C2 map and let (Y) denote the set of eigenvalues of the derivative DYp, when p varies in R3. We begin proving that if, for some ε>0, (Y) (-ε,ε)=, then the foliation F(k), with k∈ \f,g,h\, made up by the level surfaces \k= constant\, consists just of planes. As a consequence, we prove a bijectivity result related to the three-dimensional case of Jelonek's Jacobian Conjecture for polynomial maps of Rn.

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