Solubility of Additive Forms of Twice Odd Degree over Ramified Quadratic Extensions of Q2
Abstract
We determine the minimal number of variables *(d, K) which guarantees a nontrivial solution for every additive form of degree d=2m, m odd, m 3 over the six ramified quadratic extensions of Q2. We prove that if K is one of \Q2(2), Q2(10), Q2(-2), Q2(-10)\, *(d,K) = 32d, and if K is one of \Q2(-1), Q2(-5)\, *(d,K) = d+1. The case d=6 was previously known.
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