General Relativity

1 General RelativityStefanos AretakisJune 30, 20182 Contents1 Special newtonian Physics .. The Birth of Special Relativity .. The Minkowski SpacetimeR3+1.. Theory .. Observers, Frames of Reference and Isometies .. and Special Covariance .. Mechanics .. Conformal Structure .. Double Null Foliation .. Penrose Diagram .. Electromagnetism and Maxwell Equations .. 232 Lorentzian Causality I .. Null Geometry .. Global Hyperbolicity.

2 Causality II .. 413 Introduction to General Equivalence Principle .. The Einstein Equations .. The Cauchy Problem .. Gravitational Redshift and Time Dilation .. Applications .. 484 Null Structure The Double Null Foliation .. Connection Coefficients .. Curvature Components .. The Algebra Calculus ofS-Tensor Fields .. Null Structure Equations .. The Characteristic Initial Value Problem .. 7234 CONTENTS5 Applications to Null Jacobi Fields and Tidal Forces.

3 Focal Points .. Causality III .. Trapped Surfaces .. Penrose Incompleteness Theorem .. Killing Horizons .. 886 Christodoulou s Memory The Null InfinityI+.. Tracing gravitational waves .. Peeling and Asymptotic Quantities .. The Memory Effect .. 1017 Black Introduction .. Black Holes and Trapped Surfaces .. Black Hole Mechanics .. Spherical Symmetry .. Setting .. Black Holes .. Kerr Black Holes.

4 1088 Lagrangian Theories and the Variational Matter Fields .. The Action Principle .. Derivation of the Energy Momentum Tensor .. Application to Linear Waves .. Noether s Theorem .. 1169 Hyperbolic The Energy Method .. A Priori Estimate .. Well-posedness of the Wave Equation .. The Wave Equation on Minkowski spacetime .. 12510 Wave Propagation on Black Introduction .. Pointwise and Energy Boundedness .. Pointwise and Energy Decay.

5 138 CONTENTS5 IntroductionGeneral Relativity is the classical theory that describes the evolution of systems underthe effect of gravity. Its history goes back to 1915 when Einstein postulated that the lawsof gravity can be expressed as a system of equations, the so-called Einstein order to formulate his theory, Einstein had to reinterpret fundamental concepts ofour experience (such as time, space, future, simultaneity, etc.) in a purely geometricalframework. The goal of this course is to highlight the geometric character of GeneralRelativity and unveil the fascinating properties of black holes, one of the most celebratedpredictions of mathematical course will start with a self-contained introduction to special Relativity and thenproceed to the more General setting of Lorentzian manifolds.

6 Next the Lagrangian formu-lation of the Einstein equations will be presented. We will formally define the notion ofblack holes and prove the incompleteness theorem of Penrose (also known as singularitytheorem). The topology of General black holes will also be investigated. Finally, we willpresent explicit spacetime solutions of the Einstein equations which contain black holeregions, such as the Schwarzschild, and more generally, the Kerr 1 Special RelativityIn both past and modern viewpoints, the universe is considered to be a continuumcomposed of events, where each event can be thought of as a point in space at an instantof time.

7 We will refer to this continuum as the spacetime. The geometric properties, andin particular the causal structure of spacetimes in newtonian physics and in the theoryof Relativity greatly differ from each other and lead to radically different perspectives forthe physical world and its begin by listing the key assumptions about spacetime in newtonian physics andthen proceed by replacing these assumptions with the postulates of special newtonian PhysicsMain assumptionsThe primary assumptions in newtonian physics are the following1.

8 There is an absolute notion of time. This implies the notion of simultaneity is The speed of light is finite and observer Observers can travel arbitrarily fast (in particular faster thanc).From the above one can immediately infer the existence of a time coordinatet Rsuchthat all the events of constant timetcompose a 3-dimensional Euclidean space. Thespacetime is topologically equivalent toR4and admits a universal coordinate system(t,x1,x2,x3).Causal structureGiven an eventpoccurring at timetp, the spacetime can be decomposed into thefollowing sets: Future ofp: Set of all events for whicht > tp.

9 Present ofp: Set of all events for whicht= 1. SPECIAL Relativity Past ofp: Set of all events for whicht < generally, we can define the future (past) of a setSto be the union of the futures(pasts) of all points : The newtonian universe and its causal structureFrom now on we consider geometric units with respect to which the light travels atspeedc= 1 relative to observers at rest. If an observer atpemits a light beam in alldirections of space, then the trajectory of this beam in spacetime will be a null cone withvertex atp.

10 We can complete this cone by considering the trajectory of light beams thatarrive at the : The newtonian universe and light trajectoriesIt is important to emphasize that in newtonian theory, in view of the existence of theabsolute timet, one only works by projecting on the Euclidean spaceR3and consideringall quantities as functions of (the space and) s theory gives a very accurate theory for objects moving at slow speeds inabsence of strong gravitational fields. However, in several circumstances difficulties arise:1.