Lagrangian families of Bridgeland moduli spaces from Gushel-Mukai fourfolds and double EPW cubes

Let $X$ be a very general Gushel-Mukai (GM) variety of dimension $n\geq 4$, and let $Y$ be a smooth hyperplane section. There are natural pull-back and push-forward functors between the semi-orthogonal components (known as the Kuznetsov components) of the derived categories of $X$ and $Y$. In the first part of the paper, we prove that the Bridgeland stability of objects is preserved by both pull-back and push-forward functors. We then explore various applications of this result, such as constructing an 8-dimensional smooth family of Lagrangian subvarieties for each moduli space of stable objects in the Kuznetsov component of a general GM fourfold, and proving the projectivity of the moduli spaces of semistable objects of any class in the Kuznetsov component of a general GM threefold, as conjectured by Perry, Pertusi, and Zhao. In the second part, we study in detail the double EPW cube, a 6-dimensional hyperk\"ahler manifold associated with a very general GM fourfold $X$, through the Bridgeland moduli space, and show that it is the maximal rationally connected (MRC) quotient of the Hilbert scheme of twisted cubics on $X$. We also prove that it admits a covering by Lagrangian subvarieties, constructed from the Hilbert schemes of twisted cubics on GM threefolds.
Comment: 62 pages. Comments are very welcome! Ver2: results are generalized to general cases