Birational invariance of higher Amitsur groups
Abstract
Let k be a field of characteristic zero and G a finite group. We prove that for all n≥ 2, the nth Amitsur group is a stable G-birational invariant of smooth projective G-varieties over k. This was previously known for n=2,3. For smooth projective G-varieties with free and finitely generated Picard group, we also prove that the vanishing of the G-equivariant universal torsor obstruction implies the vanishing of the nth Amitsur group, for all n≥ 2. This was known for n=2. Our approach allows for effective computations of these obstructions; we illustrate this with several examples.
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