Models of Brauer-Severi surface bundles

Abstract: This paper is motivated by the study of rationality properties of Mori fiber spaces. These are algebraic varieties, naturally occurring in the minimal model program, typically via contractions along extremal rays; they are fibrations with geometrically rational generic fiber. Widely studied are conic bundles π : X → S, when the generic fiber is a conic. According to the Sarkisov program [60], there exists a birational modification/ / S such that: (i) the general fiber ofπ is a smooth conic, (ii) the discrimina… Show more

“…An analogous result for Brauer-Severi surface bundles, i.e. fibrations whose generic fiber is a form of P 2 , has been proven by Kresch and Tschinkel in [12], also using root stack techniques.…”

Conic bundles and iterated root stacks

“…An analogous result for Brauer-Severi surface bundles, i.e. fibrations whose generic fiber is a form of P 2 , has been proven by Kresch and Tschinkel in [12], also using root stack techniques.…”

Conic bundles and iterated root stacks

“…For involution surfaces, as well as all of the singular degenerations in Definition 1, the dualizing sheaf has dual which is very ample with 9-dimensional space of global sections. As in [7,Rem. 4.2] and its consequences mentioned in Section 7 of op.…”

“…where the bottom morphism is proper birational and T → S is finite of degree 2. We conclude by applying Theorem 6 over the complement of the singular locus of the image in S of the degeneracy locus of the conic bundle filling in over the missing points as in the proof of Theorem 1.2 of [7].…”

“…In this paper, we continue our investigation of del Pezzo fibrations, initiated in [7]. Here we treat the case of fibrations in minimal del Pezzo surfaces of degree 8, also known as involution surfaces and described from the arithmetic viewpoint, e.g., in [1].…”

Involution surface bundles over surfaces

“…The proof of Theorem 1 relies on the construction of good models of Brauer-Severi surface bundles in [12]. A new ingredient is a variant of the standard elementary transformation of vector bundles.…”

Stable rationality of Brauer–Severi surface bundles