Kato-Milne Cohomology and Polynomial Forms

Abstract

Given a prime number p, a field F with char(F)=p and a positive integer n, we study the class-preserving modifications of Kato-Milne classes of decomposable differential forms. These modifications demonstrate a natural connection between differential forms and p-regular forms. A p-regular form is defined to be a homogeneous polynomial form of degree p for which there is no nonzero point where all the order p-1 partial derivatives vanish simultaneously. We define a Cp,m field to be a field over which every p-regular form of dimension greater than pm is isotropic. The main results are that for a Cp,m field F, the symbol length of Hp2(F) is bounded from above by pm-1-1 and for any n ≥ (m-1) 2(p) +1, Hpn+1(F)=0.