English

On consecutive perfect powers with elementary methods

Number Theory 2017-02-14 v4

Abstract

Catalan's conjecture claims that the Diophantine equation xpyq=1x^p-y^q=1 admits the unique solution 3223=13^2-2^3=1 in integers x,y,p,q2x,y,p,q \ge 2. The conjecture has been finally proved by P. Mih\u{a}ilescu (2002) using the theory of cyclotomic fields and Galois modules. Here, relying only on elementary techniques, we prove several instances of this classical result. In particular, we prove the conjecture in the following cases: pp even (due to V.A. Lebesgue), qq is even (due to L. Euler and Chao Ko), xx divides qq, yy divides x1x-1, yy is a power of a prime, and ypp/2y\le p^{p/2}.

Keywords

Cite

@article{arxiv.1305.0892,
  title  = {On consecutive perfect powers with elementary methods},
  author = {Paolo Leonetti},
  journal= {arXiv preprint arXiv:1305.0892},
  year   = {2017}
}

Comments

Improved exposition and result in Section 9

R2 v1 2026-06-22T00:11:24.906Z