Symbol Length of Classes in Milnor K-groups

Abstract

Given a field F, a positive integer m and an integer n≥ 2, we prove that the symbol length of classes in Milnor's K-groups Kn F/2m Kn F that are equivalent to single symbols under the embedding into Kn F/2m+1 Kn F is at most 2n-1 under the assumption that F ⊃eq μ2m+1. Since for n=2, K2 F/2m K2 F 2mBr(F), this coincides with the upper bound of 2 for the symbol length of central simple algebras of exponent 2m that are Brauer equivalent to a single symbol algebra of degree 2m+1 proved by Tignol in 1983. We also consider the cases where the embedding into Kn F/2m+1 Kn F is of symbol length 2, 3 and 4 (the latter when n=2). We finish with studying the symbol length of classes in K3/3m K3 F whose embedding into K3 F/3m+1 K3 F is one symbol when F ⊃eq μ3m+1.