Brauer Group of Moduli Spaces of Pairs

Abstract: Abstract. We show that the Brauer group of the moduli space of stable pairs with fixed determinant over a curve is zero.

“…It has fiber P Hom(L e , L 1 ). The same argument as in the proof of Proposition 3.2 in [7] shows that the Brauer class…”

“…It has fiber P Hom(L e , L 1 ). The same argument as in the proof of Proposition 3.2 in [7] shows that the Brauer class cl(U m ) ∈ Br(M s (n 1 , d 1 )) satisfies cl(U m ) = ± cl(X + T ′ ). (6.1)…”

Motives and the Hodge conjecture for moduli spaces of pairs

“…It has fiber P Hom(L e , L 1 ). The same argument as in the proof of Proposition 3.2 in [7] shows that the Brauer class…”

“…It has fiber P Hom(L e , L 1 ). The same argument as in the proof of Proposition 3.2 in [7] shows that the Brauer class cl(U m ) ∈ Br(M s (n 1 , d 1 )) satisfies cl(U m ) = ± cl(X + T ′ ). (6.1)…”

Motives and the Hodge conjecture for moduli spaces of pairs

“…In [15], a Torelli type theorem for the moduli spaces M τ (r, Λ) is proved; this amounts to the following: the algebraic structure of the moduli space allows to recover the complex structure of X. We also mention that in [4], the authors compute the Brauer group of these moduli spaces.…”

Rationality of the Moduli Space of Stable Pairs over a Complex Curve