Purely exponential Diophantine equations with four terms of consecutive bases: contribution to Skolem's conjecture
Abstract
We study purely exponential Diophantine equations with four terms of consecutive bases. Notably, we prove that all solutions to the equation \[ nx=(n+1)y+(n+2)z+(n+3)w \] in positive integers n,x,y,z and w are given by (n,x,y,z,w)=(2,5,1,1,2), (3,3,2,1,1). Our proof of this result for each n 4 provides an explicit modulus M such that the corresponding equation has no solution already modulo M. This contributes to a classical problem posed by T. Skolem in 1930's on a local-global principle on purely exponential Diophantine equations.
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