A Generalized abc-Conjecture over Function Fields

We prove an unconditional analog of Artin's conjecture for the function field of a curve over a finite field. 1 teys Acadumic Press. fnc.

Let r be a power of a prime number p, F r be the finite field of r elements, and F r [T] be the polynomial ring over F r . As an analogue to the Riemann zeta function over Z, Goss constructed the zeta function `Fr [T] (s) over F r [T]. In order to study this zeta function, Thakur calculated the divi

We examine the Mazur-Tate canonical height pairing defined between an abelian variety over a global field and its dual. We show in the case of global function fields that certain of these pairings are annihilated by universal norms coming from Carlitz cyclotomic extensions. Furthermore, for elliptic

X generalization of a theorem of A. D. PORTER on the number of solutions of the k-linear equation 2 ai n x , ~ = a over a finite field is given.

We show by a counterexample that Perret's conjecture on in"nite class "eld towers for global function "elds is wrong, and so Perret's method of in"nite rami"ed class "eld towers in the asymptotic theory of global function "elds with many rational places breaks down.