Moduli spaces of $\alpha$-stable pairs and wall-crossing on $\mathbb{P}^2$

Abstract: Abstract. We study the wall-crossing of the moduli spaces M α (d, 1) of α-stable pairs with linear Hilbert polynomial dm+ 1 on the projective plane P 2 as we alter the parameter α. When d is 4 or 5, at each wall, the moduli spaces are related by a smooth blow-up morphism followed by a smooth blow-down morphism, where one can describe the blow-up centers geometrically. As a byproduct, we obtain the Poincaré polynomials of the moduli spaces M(d, 1) of stable sheaves. We also discuss the wall-crossing when the nu… Show more

“…To compute the Poincaré polynomial, we relate M β birationally with the moduli spaces of δ-stable pairs by wall-crossing. This approach is taken in [6] to compute the Betti numbers for M β when S = P 2 and β = 4 and 5. See also [9].…”

“…This wall-crossing phenomenon can be explained by elementary modification of pairs. See [35, §3], [15,Lemma.4.24] and [6]. Now each Ext group can be computed using the following proposition.…”

“…We use the wall-crossing in the moduli space of δ-stable pairs. The same strategy is used in [6] to study M β when S = P 2 . See § 3.3 for a review of δ-stable pair theory.…”

Local BPS Invariants: Enumerative Aspects and Wall-Crossing

“…To compute the Poincaré polynomial, we relate M β birationally with the moduli spaces of δ-stable pairs by wall-crossing. This approach is taken in [6] to compute the Betti numbers for M β when S = P 2 and β = 4 and 5. See also [9].…”

“…This wall-crossing phenomenon can be explained by elementary modification of pairs. See [35, §3], [15,Lemma.4.24] and [6]. Now each Ext group can be computed using the following proposition.…”

“…We use the wall-crossing in the moduli space of δ-stable pairs. The same strategy is used in [6] to study M β when S = P 2 . See § 3.3 for a review of δ-stable pair theory.…”

Local BPS Invariants: Enumerative Aspects and Wall-Crossing

“…In the study of Fano manifolds, the space of lines in Gr(2, n) has been one of the main tools to study the geometry of the linear or quadratic sections of Gr(2, n) ( [31]). In fact, the codimension two linear section of Gr (2,5) is the answer for Hirzebruch's question in dimension 4: Classify all minimal compactifications of C 4 .…”

“…In [15], the authors provided new such a pair by using the double cover (the so-called double symmetroid) of the determinantal symmetroid in the space of quadrics P(Sym 2 C 5 * ). One of the main steps of the construction is to find an explicit birational relation between the double symmetroid and the Hilbert scheme of conics in the Grassmannian Gr(3, 5) ∼ = Gr (2,5) of planes. This relation has been established in [16] in a broader setting, namely, for the space of quadrics in P(Sym 2 C n+1 * ) and the Hilbert scheme of conics in Gr(n − 1, n + 1) ∼ = Gr(2, n + 1).…”

Mori's Program for the Moduli Space of Conics in Grassmannian

A new method toward the Landau–Ginzburg/Calabi–Yau correspondence via quasi-maps