The Construction and Application of Penrose Diagrams, with a Focus on the Maximally Analytically Extended Schwarzschild Spacetime
Abstract
We present a detailed, mathematically rigorous description of the construction procedure of Penrose diagrams for the example of the maximal analytic extension of the exterior Schwarzschild spacetime. To this end, we first outline the basic idea underlying Penrose diagrams, state the general requirements on the spacetimes to be visualized, and give a definition of Penrose diagrams. We then construct the Penrose diagram of the maximally analytically extended Schwarzschild spacetime and discuss the characteristics and properties corresponding to this particular Penrose diagram. As an application, we work out the differences between the spacetime and null variants of the canonical advanced Eddington-Finkelstein coordinate representations of the exterior Schwarzschild spacetime by explicitly constructing and visually analyzing Penrose diagrams equipped with foliations of the level sets of the respective Eddington-Finkelstein time and null coordinates. Throughout the course of the paper, we provide brief accounts of the relevant parts of the seminal publications on the exterior Schwarzschild solution by Schwarzschild himself, Kruskal, Eddington, Finkelstein, and Penrose. This paper is primarily of pedagogical nature aimed at graduate students in physics and applied mathematics (with a background in general relativity and differential geometry), serving mainly as an introduction to Penrose diagrams and coordinate representations of the exterior Schwarzschild spacetime.