Rational solutions to the Variants of Erdos- Selfridge superelliptic curves

Abstract

For the superelliptic curves of the form (x+1) ·s(x+i-1)(x+i+1)·s (x+k)=y with x,y ∈ Q, y≠ 0, k ≥ 3, 1≤ i≤ k, ≥ 2, a prime, Das, Laishram, Saradha, and Edis showed that the superelliptic curve has no rational points for ≥ e3k. In fact, the double exponential bound, obtained in these papers is far from reality. In this paper, we study the superelliptic curves for small values of k. In particular, we explicitly solve the above equation for 4 ≤ k ≤ 8.