Abstract
The mod-2 arithmetic Milnor invariants, introduced by Morishita, provide a decomposition law for primes in canonical Galois extensions of Q with unitriangular Galois groups and contain the Legendre and Rédei symbols as special cases. Morishita further proposed a notion of mod-q arithmetic Milnor invariants, where q is a prime power, for number fields containing the qth roots of unity and satisfying certain class field theory assumptions. We extend this theory from the number field context to general fields, by introducing a notion of a linking invariant for discrete valuations and orderings. We further express it as a Magnus homomorphism coefficient and relate it to Massey product elements in Galois cohomology.
Original language | English |
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Article number | 64 |
Journal | Research in Mathematical Sciences |
Volume | 11 |
Issue number | 4 |
DOIs | |
State | Published - 1 Dec 2024 |
Keywords
- 12G05
- Legendre symbols
- Linking invariants
- Linking structures
- Massey products
- Milnor invariants
- Orderings
- Primary 11R32
- Rédei symbols
- Secondary 11R34
- Valuations
ASJC Scopus subject areas
- Theoretical Computer Science
- Mathematics (miscellaneous)
- Computational Mathematics
- Applied Mathematics