Familles d'equations de Thue-Mahler n'ayant que des solutions triviales

Abstract

Let K be a number field, let S be a finite set of places of K containing the archimedean places and let μ, α1,α2,α3 be non--zero elements in K. Denote by the ring of S--integers in K and by × the group of S--units. Then the set of equivalence classes (namely, up to multiplication by S--units) of the solutions (x,y,z,1, 2,3,)∈3×(×)4 of the diophantine equation (X-α1 E1 Y) (X-α2E2 Y) (X-α3E3 Y)Z=μ E, satisfying \α11,α22,α33\= 3, is finite. With the help of this last result, we exhibit new families of Thue-Mahler equations having only trivial solutions. Furthermore, we produce an effective upper bound for the number of these solutions. The proofs of this paper rest heavily on Schmidt's subspace theorem.