Real GIT with applications to compatible representations and Wick-rotations

Abstract

Motivated by Wick-rotations of pseudo-Riemannian manifolds, we study real geometric invariant theory (GIT) and compatible representations. We extend some of the results from earlier works W2,W1, in particular, we give some sufficient as well as necessary conditions for when pseudo-Riemannian manifolds are Wick-rotatable to other signatures. For arbitrary signatures, we consider a Wick-rotatable pseudo-Riemannian manifold with closed O(p,q)-orbits, and thus generalise the existence condition found in W1. Using these existence conditions we also derive an invariance theorem for Wick-rotations of arbitrary signatures.