Cohomological Kernels of Elementary Abelian Degree p2 Extensions

Abstract

Let p be an odd prime, F a field with a primitive p2th root of unity, and E=F([p]b1,[p]b2) an elementary abelian extension of degree p2. This paper studies the cohomological kernel Hn(E/F, Z/p Z):= ker(Hn(F, Z/p Z)→ Hn(E, Z/p Z)) for all n. When p=3, using tools of Positselski, a six-term exact sequence is given that is analogous to the p=2 case. As an application the quotient Hn(E/F, Z/3 Z)/ Decn(E/F, Z/3 Z) where Decn(E/F, Z/3 Z) is the "expected kernel'' is described. This quotient group is of interest because computations of Tignol [T] that show when n=2 nontrivial elements give rise to indecomposible division algebras of exponent 3 and index 9.