Invariant divisors and equivariant line bundles

TL;DR

This paper develops a comprehensive global theory of invariant divisors and equivariant line bundles for Lie algebra actions on complex manifolds, with applications to differential invariants and classical geometries.

Contribution

It introduces a cohomological framework for quivariant line bundles and invariant divisors, extending classical notions to a global setting and applying to differential invariants and geometry.

Findings

Cohomological description of quivariant line bundles using a double complex.

Characterization of multipliers of relative differential invariants.

Examples in projective geometry and ODEs illustrating the theory.

Abstract

Scalar relative invariants play an important role in the theory of group actions on a manifold as their zero sets are invariant hypersurfaces. Relative invariants are central in many applications, where they often are treated locally since an invariant hypersurface may not be a locus of a single function. Our aim is to establish a global theory of relative invariants. For a Lie algebra $\mathfrak{g}$ of holomorphic vector fields on a complex manifold $M$, any holomorphic $\mathfrak{g}$-invariant hypersurface is given in terms of a $\mathfrak{g}$-invariant divisor. This generalizes the classical notion of scalar relative $\mathfrak{g}$-invariant. Any $\mathfrak{g}$-invariant divisor gives rise to a $\mathfrak{g}$-equivariant line bundle, and a large part of this paper is therefore devoted to the investigation of the group $\mathrm{Pic}_{\mathfrak{g}}(M)$ of $\mathfrak{g}$-equivariant line bundles. We give a cohomological description of $\mathrm{Pic}_{\mathfrak{g}}(M)$ in terms of a double complex interpolating the Chevalley-Eilenberg complex for $\mathfrak{g}$ with the \v{C}ech complex of the sheaf of holomorphic functions on $M$. We also obtain results about polynomial divisors on affine bundles and jet bundles. This has applications to the theory of differential invariants. Those were actively studied in relation to invariant differential equations, but the description of multipliers (or weights) of relative differential invariants was an open problem. We derive a characterization of them with our general theory. Examples, including projective geometry of curves and second-order ODEs, not only illustrate the developed machinery, but also give another approach and rigorously justify some classical computations. At the end, we briefly discuss generalizations of this theory.