Differential Invariants of the 2D Conformal Lie Algebra Action

The goal of this paper is to examine the relationship between a domain \(R\) and its subring of invariants \(R^{L}\), under the action of a finite-dimensional restricted Lie algebra \(L\). We first show that there exists a nondegenerate \(\left(R^{L}, R^{L}\right)\)-bimodule "trace-like" map \(g: R

We prove that the scalar and 2 = 2 matrix differential operators which preserve the simplest scalar and vector-valued polynomial modules in two variables have a fundamental Lie algebraic structure. Our approach is based on a general graphical method which does not require the modules to be irreducib

Using integrable irreducible representations of generalized twisted affine Lie algebra modules, we give a realization of the space of conformal blocks of conformal field theory on a stable algebraic curve. Many basic properties of the conformal blocks, such as finite dimensionality of the space, inv