polystability

Polystability is a concept in mathematics, particularly in the field of differential geometry and complex geometry, that describes the stability of certain geometric structures. It is a generalization of the notion of stability in the context of holomorphic vector bundles over complex manifolds. The term was introduced by Simon Donaldson in the 1980s as part of his work on the Yang-Mills equations and their applications to four-dimensional manifolds.

A holomorphic vector bundle over a complex manifold is said to be polystable if it can be

Polystability is a crucial concept in the study of moduli spaces of holomorphic vector bundles, which are

The concept of polystability has also been generalized to other contexts, such as the study of sheaves