It is shown that the Jacobian Conjecture (in all dimensions) is equivalent to the following statement: for almost all prime numbers p and each Keller map F is an element of Z(p) [X](n) Pan (i.e. det JF = 1), the induced map (F) over bar : F-p(n) -> F-p(n) is not the zero map.

• 出版日期2015-7