Wieferich's criterion and the abc-conjecture

Following Elkies (Internat. Math. Res. Notices 7 (1991) 99-109) and Bombieri (Roth's theorem and the abc-conjecture, preprint, ETH Zu¨rich, 1994), we show that the ABC conjecture implies the one-dimensional case of Vojta's height inequality. The main geometric tool is the construction of a Bely$ ı ı

We show that there exists an infinite sequence of sums P: a+b=c of rational integers with large height compared to the radical: h(P) r(P)+4K l -h(P)Âlog h(P) with K l =2 lÂ2 4 -2?Âe>1.517 for l=0.5990. This improves the result of Stewart and Tijdeman [9]. The value of l comes from an asymptotic boun

We consider non-degenerate binary recurring sequences with positive discriminant, relatively prime parameters, and whose initial terms satisfy a certain divisibility condition. Assuming that the ABC conjecture is true, we show that the powerful part of the terms of the sequence remain ``small.'' In

## Abstract In his recent work Thomassen [J Combin Theory Ser B 93 (2005), 95–105] discussed various refinements of Hajós conjecture. Shortly after Mohar [Electr J Combin 12 (2005), N15] provided an answer to Thomassen's Conjecture 6.5, and proposed a possible extension. The aim of this article is