On power values of pyramidal numbers, II

Abstract

For m ≥ 3, we define the mth order pyramidal number by \[ Pyrm(x) = 16 x(x+1)((m-2)x+5-m). \] In a previous paper, written by the first-, second-, and fourth-named authors, all solutions to the equation Pyrm(x) = y2 are found in positive integers x and y, for 6 ≤ m ≤ 100. In this paper, we consider the question of higher powers, and find all solutions to the equation Pyrm(x) = yn in positive integers x, y, and n, with n ≥ 3, and 5 ≤ m ≤ 50. We reduce the problem to a study of systems of binomial Thue equations, and use a combination of local arguments, the modular method via Frey curves, and bounds arising from linear forms in logarithms to solve the problem.

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