Another generalization of Mason's ABC-theorem

Abstract

We show a generalization of Mason's ABC-theorem, with the only conditions that the greatest common divisor has been divided out and no proper subsum of the (possibly multivariate) polynomial sum f1 + f2 + ... + fn = 0 vanishes. As a result, we show that the generalized Fermat-Catalan equation for polynomials: g1d1 + g1d2 + ... + gndn = 0 has no non-constant solutions if the greatest common divisor of the terms equals one, no proper subsum vanishes and the hyperbolic sum 1/d1 + 1/d2 + ... + 1/dn is at most 1/(n-2). Furthermore, we show that the generalized Fermat-equation for polynomials g1d + g1d + ... + gnd = 0 has no 'interesting' solutions if d >= n(n-2).