On the second cohomology of the norm one group of a p-adic division algebra

Abstract

Let F be a p-adic field, that is, a finite extension of Qp. Let D be a finite-dimensional central division algebra over F and let SL1(D) be the group of elements of reduced norm 1 in D. Prasad and Raghunathan proved that H2(SL1(D), R/ Z) is a cyclic p-group whose order is bounded from below by the number of p-power roots of unity in F, unless D is a quaternion algebra over Q2. In this paper we give an explicit upper bound for the order of H2(SL1(D), R/ Z) for p≥ 5 and determine H2(SL1(D), R/ Z) precisely when F is cyclotomic, p≥ 19 and the degree of D is not a power of p.