Causal Relationship: a new tool for the causal characterization of Lorentzian manifolds

TL;DR

This paper introduces the concept of causal relations between Lorentzian manifolds, providing a new framework for classifying spacetimes based on their causal structures and equivalence classes.

Contribution

It defines and studies causal relations, introduces isocausal equivalence, and establishes a classification scheme for Lorentzian manifolds based on their causal properties.

Findings

Causal relations are directional and lead to the concept of isocausal manifolds.

Isocausal manifolds share the same causality constraints.

A partial order classifies manifolds by their causal structures.

Abstract

We define and study a new kind of relation between two diffeomorphic Lorentzian manifolds called {\em causal relation}, which is any diffeomorphism characterized by mapping every causal vector of the first manifold onto a causal vector of the second. We perform a thorough study of the mathematical properties of causal relations and prove in particular that two given Lorentzian manifolds (say $V$ and $W$) may be causally related only in one direction (say from $V$ to $W$, but not from $W$ to $V$). This leads us to the concept of causally equivalent (or {\em isocausal} in short) Lorentzian manifolds as those mutually causally related. This concept is more general and of a more basic nature than the conformal relationship, because we prove the remarkable result that a conformal relation $\f$ is characterized by the fact of being a causal relation of the {\em particular} kind in which both $\f$ and $\f^{-1}$ are causal relations. For isocausal Lorentzian manifolds there are one-to-one correspondences, which sometimes are non-trivial, between several classes of their respective future (and past) objects. A more important feature of isocausal Lorentzian manifolds is that they satisfy the same causality constraints. This indicates that the causal equivalence provides a possible characterization of the {\it basic causal structure}, in the sense of mutual causal compatibility, for Lorentzian manifolds. Thus, we introduce a partial order for the equivalence classes of isocausal Lorentzian manifolds providing a classification of spacetimes in terms of their causal properties, and a classification of all the causal structures that a given fixed manifold can have. A full abstract inside the paper.