Moduli spaces of vector bundles form a central pillar in modern algebraic geometry, offering a systematic classification of bundles up to isomorphism and encapsulating their deformation theory. A ...

Moduli spaces provide a geometric framework for parametrising families of algebraic varieties or sheaves, organising objects that share common invariants into a coherent space. Their construction ...

The term “moduli space” was coined by Riemann for the space $\mathfrak{M}_g$ parametrizing all one-dimensional complex manifolds of genus $g$. Variants of this ...