A Tate algebra version of the Jacobian Conjecture
Abstract
This paper investigates a Tate algebra version of the Jacobian conjecture, referred to as the Tate-Jacobian conjecture, for commutative rings R equipped with an I-adic topology. We show that if the I-adic topology on R is Hausdorff and R/I is a subring of a Q-algebra, then the Tate-Jacobian conjecture is equivalent to the Jacobian conjecture. Conversely, if R/I has positive characteristic, the Tate-Jacobian conjecture fails. Furthermore, we establish that the Jacobian conjecture for C is equivalent to the following statement: for all but finitely many primes p, the inverse of a polynomial map over Cp whose Jacobian determinant is an element of Cp× lies in the Tate algebra over Cp.
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