On Brauer p-dimensions and index-exponent relations over finitely-generated field extensions

Abstract

Let E be a field of absolute Brauer dimension abrd(E), and F/E a transcendental finitely-generated extension. This paper shows that the Brauer dimension Brd(F) is infinite, if abrd(E) = ∞ . When the absolute Brauer p-dimension abrdp(E) is infinite, for some prime number p, it proves that for each pair (n, m) of integers with n m > 0, there is a central division F-algebra of Schur index p n and exponent p m. Lower bounds on the Brauer p-dimension Brdp(F) are obtained in some important special cases where abrdp(E) < ∞ . These results solve negatively a problem posed by Auel et al. (Transf. Groups 16: 219-264, 2011).