Splitting p-primary cohomology classes of tori in characteristic p
Abstract
We prove that p-primary cohomology classes of a torus T over a global function field of characteristic p may be split by suitable separable p-primary extensions. More precisely, we show that such cohomology classes will split in any ``large'' p-primary extension (and in fact, prove the same for -primary classes over ``large'' -primary extensions for every prime , including ≠ char(K)), and we prove that pn-torsion classes may be split by a (solvable) separable p-primary extension of degree ≤ (pn)1+cmlog(m)3 for an explicitly computable universal constant c > 0, where m is the degree of a finite Galois extension splitting the torus T. Along the way, we also prove Grunwald-Wang type results of independent interest which allow one to approximate a given finite list of abelian p-primary local extensions of places of a global function field by a suitable global extension.
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