A sharp degree bound in the real Jacobian conjecture

Abstract

Let F=(p,q): R2 R2 be a polynomial map with nowhere zero Jacobian determinant. A long-standing problem is to determine the largest integer k such that the condition °p k guarantees the global injectivity of F. Although several partial results have been obtained over the past 30 years, the sharp degree bound has remained unknown. In this paper, we prove that F is injective whenever °p=6. On the other hand, we construct a non-injective polynomial map with nowhere vanishing Jacobian determinant for which °p=7. Combined with the previously known injectivity results for °p 5, our results completely settle the problem and establish the optimal degree bound. More precisely, we show that 7 is the minimal degree for which non-injective examples can occur.