English

Thue's inequalities and the hypergeometric method

Number Theory 2017-02-14 v3

Abstract

Following a method originally due to Siegel, we establish upper bounds for the number of primitive integer solutions to inequalities of the shape 0<F(x,y)h0<|F(x, y)| \leq h, where F(x,y)=(αx+βy)r(γx+δy)rZ[x,y]F(x , y) =(\alpha x + \beta y)^r -(\gamma x + \delta y)^r \in \mathbb{Z}[x ,y], α\alpha, β\beta, γ\gamma and δ\delta are algebraic constants with αδβγ0\alpha\delta-\beta\gamma \neq 0, and r3r \geq 3 and hh are integers. As an important application, we pay special attention to the binomial Thue's inequaities axrbyrc|ax^r - by^r| \leq c. The proofs are based on the hypergeometric method of Thue and Siegel and its refinement by Evertse.

Cite

@article{arxiv.1603.03340,
  title  = {Thue's inequalities and the hypergeometric method},
  author = {Shabnam Akhtari and N. Saradha and Divyum Sharma},
  journal= {arXiv preprint arXiv:1603.03340},
  year   = {2017}
}

Comments

45 pages

R2 v1 2026-06-22T13:08:14.360Z