Wall-crossings for twisted quiver bundles (Q2854049)

For a finite quiver \(Q\), let \(Q_0\), \(Q_1\), \(\overline{Q}\), be respectively the set of vertices, the set of edges, and the double quiver of \(Q\) and \(0\in Q_0\). Let \(X\) be a smooth projective curve with the dualizing sheaf \(\omega_X\) and \(\lambda \in \Gamma(X,\omega_X)\), \(M_b\) be an invertible sheaf on \(X\) for each \(a \in \overline{Q}_1\), and \(f_{b,\overline{b}}:M_b \otimes M_{\overline{b}}\to \omega_X^\vee\) be an isomorphism for each \(b\in Q_1\). A collection of \(\mathcal{O}_X\)-sheaves \(E_i\) for \(i\in Q_0\), and homomorphisms \(\phi_a: M_a\otimes E_{ta} \to E_{ha}\) for each \(a \in \overline{Q}_1\) is called \(\mathbf{M}\)-twisted quiver sheaf on \(X\) if it satisfies NEWLINE\[NEWLINE\sum_{i\in Q_0 \backslash \{0\}}\left(\sum_{a \in \overline{Q}_1: ha=i}(-1)^{|a|}\phi_a \circ (\text{Id}_{M_a}\otimes \phi_{\overline{a}})\right)-\lambda \otimes \text{Id}_{E_0}=0.NEWLINE\]NEWLINENEWLINENEWLINEThe paper under review studies the abelian category of a framed version of \(\mathbf{M}\)-twisted quiver sheaves on \(X\) denoted by \(\mathcal{A}'\). A one parameter family of stability condition is defined on \(\mathcal{A}'\) depending on \(\tau \in \mathbb{R}_{>0}\), and the generalized Donaldson-Thomas invariants of \(\tau\)-semistable objects is studied in the context of Joyce-Song. The paper under review proves a wall-crossing formula for these invariants following the approach of Chuang, Diaconescu and Pan. The motivation behind this is that the stability of the twisted quasi maps from \(X\) to the corresponding symplectic quotient turns out to be asymptotic to the 1-parameter stability condition on \(\mathcal{A}'\). The moduli space of stable quasi maps to holomorphic symplectic quotients was studied before by the first author of the paper under review.