Essential dimension of simple algebras in positive characteristic

Abstract

Let p be a prime integer, 1≤ s≤ r integers, F a field of characteristic p. Let Decpr denote the class of the tensor product of r p-symbols and Algpr,ps denote the class of central simple algebras of degree pr and exponent dividing ps. For any integers s<r, we find a lower bound for the essential p-dimension of Algpr,ps. Furthermore, we compute upper bounds for Decpr and Alg8,2 over (F)=p and (F)=2, respectively. As a result, we show 2(Alg4,2)=(Alg4,2)=2(4/2)=(4/2)=3 and 3≤ (Alg8,2)=(8/2)≤ 10 over a field of characteristic 2.