Intrinsic Donaldson-Thomas theory. I. Component lattices of stacks (2502.13892v1)

Abstract: This is the first paper in a series on intrinsic Donaldson-Thomas theory, a generalization of Donaldson-Thomas theory from the linear case, or the case of moduli stacks of objects in $3$-Calabi-Yau abelian categories, to the non-linear case of general $(-1)$-shifted symplectic stacks. This is done by developing a new framework for studying the enumerative geometry of general algebraic stacks, and we expect that this framework can also be applied to extending other types of enumerative theories for linear stacks to the non-linear case. In this paper, we establish the foundations of our framework. We introduce the component lattice of an algebraic stack, which is the key combinatorial object in our theory. It generalizes and globalizes the cocharacter lattice and the Weyl group of an algebraic group, and is defined as the set of connected components of the stack of graded points of the original stack. We prove several results on the structure of graded and filtered points of a stack using the component lattice. The first is the constancy theorem, which states that there is a wall-and-chamber structure on the component lattice, such that the isomorphism types of connected components of the stacks of graded and filtered points stay constant within each chamber. The second is the finiteness theorem, providing a criterion for the finiteness of the number of possible isomorphism types of these components. The third is the associativity theorem, generalizing the structure of Hall algebras from linear stacks to general stacks, involving a notion of Hall categories. Finally, we discuss some applications of these results outside Donaldson-Thomas theory, including a construction of stacks of real-weighted filtrations, and a generalization of the semistable reduction theorem to real-weighted filtrations.