The un-invariant and the Symbol Length of H2n(F)

Abstract

Given a field F of char(F)=2, we define un(F) to be the maximal dimension of an anisotropic form in Iqn F. For n=1 it recaptures the definition of u(F). We study the relations between this value and the symbol length of H2n(F), denoted by sl2n(F). We show for any n ≥ 2 that if 2n ≤ un(F) ≤ u2(F) < ∞ then sl2n(F) ≤ Πi=2n (ui(F)2+1-2i-1). As a result, if u(F) is finite then sl2n(F) is finite for any n, a fact which was previously proven when char(F) ≠ 2 by Saltman and Krashen. We also show that if sl2n(F)=1 then un(F) is either 2n or 2n+1.