Solubility of Additive Forms of Twice Odd Degree over Q2(5)

Abstract

We prove that an additive form of degree d=2m, m odd, m3, over the unramified quadratic extension Q2(5) has a nontrivial zero if the number of variables s satisifies s 4d+1. If 3 d, then there exists a nontrivial zero if s 32d + 1, this bound being optimal. We give examples of forms in 3d variables without a nontrivial zero in case that 3 d.

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