Your search keyword '"HAASE, BASTIAN"' showing total 2 results

1. Gerbe patching and a Mayer-Vietoris sequence over arithmetic curves

Author

Haase, Bastian

Subjects

Mathematics - Algebraic Geometry, FOS: Mathematics, Primary: 14H25, 18G50 Secondary: 14M17, Algebraic Geometry (math.AG)

Abstract

We discuss patching techniques and local-global principles for gerbes over arithmetic curves. Our patching setup is that introduced by Harbater, Hartmann and Krashen. Our results for gerbes can be viewed as a 2-categorical analogue on their results for torsors. Along the way, we also discuss bitorsor patching and local-global principles for bitorsors. As an application of these results, we obtain a Mayer-Vietoris sequence with respect to patches for non-abelian hypercohomology sets with values in the crossed module G->Aut(G) for G a linear algebraic group. Using local-global principles for gerbes, we also prove local-global principles for points on homogeneous spaces under linear algebraic groups H that are special (e.g. SL_n and Sp_2n) for certain kind of stabilizers.

Published

2017

2. Brauer p-dimension of complete discretely valued fields.

Author

Bhaskhar, Nivedita and Haase, Bastian

Subjects

*BRAUER groups, *ALGEBRA, *MATHEMATICS

Abstract

Let K be a complete discretely valued field of characteristic 0 with residue field \kappa of characteristic p. Let n be the p-rank of κ , i.e., pn = [κ : κp]. It was proved by Parimala and Suresh [Invent. Math. 197 (2014), no. 1, pp. 215-235] that the Brauer p-dimension of K lies between n/2 and 2n. For n ≤ 3, we improve the upper bound to n + 1 and provide examples to show that our bound is sharp. For n ≤ 2, we also improve the lower bound to n. For general n, we construct a family of fields Kn with residue fields of p-rank n such that Kn admits a central simple algebra Dn of period p and index pn+1. Our sharp lower bounds for n ≤ 2 and upper bounds for n ≤ 3 in combination with the nature of these examples motivate us to conjecture that the Brauer p-dimension of such fields always lies between n and n + 1. [ABSTRACT FROM AUTHOR]

Published

2020