Classes in Hpmn+1(F) of lower exponent

Abstract

Let F be a field of characteristic p>0. We prove that if a symbol A=ω β1 … βn in Hpmn+1(F) is of exponent dividing pm-1, then its symbol length in Hpm-1n+1(F) is at most pn. In the case n=2 we also prove that if A= ω1 β1+·s+ωr βr in Hpm2(F) satisfies (A)|pm-1, then the symbol length of A in Hpm-12(F) is at most pr+r-1. We conclude by looking at the case p=2 and proving that if A is a sum of two symbols in H2mn+1(F) and A |2m-1, then the symbol length of A in H2m-1n+1(F) is at most (2n+1)2n. Our results use norm conditions in characteristic p in the same manner as Matrzi in his paper ``On the symbol length of symbols''.