Fermat near misses and the integral Hilbert Property

Abstract

We consider the Diophantine equation x4 + y4 - w2 = n for n ∈ Z, which is related to near misses for the quartic case of Fermat's Last Theorem. For certain n we show that the set of solutions is infinite, or more generally not thin. Our approach is via the geometry of del Pezzo surfaces of degree 2, and we prove a more general result on non-thinness of integral points on double conic bundle surfaces.

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