English

Solving simultaneously Thue equations in the almost totally imaginary case

Number Theory 2015-05-26 v1

Abstract

Let α\alpha be an algebraic number of degree d3d\ge 3 having at most one real conjugate and let KK be the algebraic number field Q(α){\mathbf Q}(\alpha). For any unit ϵ\epsilon of KK such that Q(αϵ)=K{\mathbf Q}(\alpha\epsilon)=K, we consider the irreducible polynomial fϵ(X)Z[X]f_\epsilon(X)\in{\mathbf Z}[X] such that fϵ(αϵ)=0f_\epsilon(\alpha\epsilon)=0. Let Fϵ(X,Y) =Ydfϵ(X/Y)Z[X,Y]F_\epsilon(X,Y)\ = Y^df_\epsilon(X/Y)\in{\mathbf Z}[X,Y] be the associated binary form. For each positive integer mm, we exhibit an effectively computable bound for the solutions (x,y,ϵ)(x,y,\epsilon) of the diophantine equation Fϵ(x,y)m|F_\epsilon(x,y)|\leq m.

Keywords

Cite

@article{arxiv.1505.06653,
  title  = {Solving simultaneously Thue equations in the almost totally imaginary case},
  author = {Claude Levesque and Michel Waldschmidt},
  journal= {arXiv preprint arXiv:1505.06653},
  year   = {2015}
}

Comments

Proceedings of the International Meeting on Number Theory HRI 2011, in honor of R. Balasubramanian. To appear

R2 v1 2026-06-22T09:40:52.656Z