Triple Massey Products over Global Fields
Let $K$ be a global field which contains a primitive $p$-th root of unity, where $p$ is a prime number. M. J. Hopkins and K. G. Wickelgren showed that for $p=2$, any triple Massey product over $K$ with respect to $\Fp$, contains 0 whenever it is defined. We show that this is true for all primes $p$.
2010 Mathematics Subject Classification: 12G05, 55S30.
Keywords and Phrases: Massey products, Galois cohomology, local fields, global fields.
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