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CALTECH PH 236A - Geometric Optics, GW Stress-Energy Tensor

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Ph 236a 5 December 2007Kip ThorneWEEK 10: Geometric Optics, GW Stress-Energy Tensor, andGeneral Relativity a s a N onlinear Field Theory in Flat SpacetimeREVISION 2 - ON DECEMBER 6NOTE: Revision 2 differs from Revision 1 by the additio n of the long-promised Problem9. Revisions 1 include:A. Ref. 2.d has been expanded to include additional sections in my book.B. Problem 8: The wave equations you are asked to derive are valid only in vaccum (i.e.when the stress-energy tensor vanishes, i.e. when t he Ricci tensor vanishes), so thephrase “in vacuum” has been added, twice.Recommended Reading:1. Stress-energy tensor for gravitational wavesa. For a quick derivation, o mitting lots of details, along the lines of what I did inclass, read Sec. 26.3.4 of Chapter 26 of Blandford and Thorne, version 0626.1.K.pdf;available at http://www.pma.caltech.edu/Courses/ph136/yr2006/ .b. For a more detailed treatment, read Sections 35.13–35.15 of MTW.c. For the energy and angular momentum carried away from a slow-motion source bygravita tional waves, computed as a surface integral of the GW energy flux T0rGW, readpage 992 of Sec. 36.7 of MTW.2. Geometric optics for wave propagation in curved spacetime.a. I suggest beginning with Section 22 .5 of MTW. This is a leisurely treatment ofgeometric optics for quasi-monochromatic electromagnetic waves, giving a lot moredetail than I did in my lectures.b. Then read (but do not do) MTW Exercise 35.15, which is the analogous geometric-optics treatment of q uasi-monochromatic gravitational waves.c. Then read Sections 26.3.5 and 26.3.6 of Blandford and Thorne, Chapter 26, version0626.1.K.pdf . This writes down the geometric optics solution in the time domain inthe form I gave in class, and verifies that i t satisfies the Einstein field equations.d. Final ly read Sections 5.A,B,D 5.D of an unpublished 1989 book t hat I have writtenon gravi tational waves (on our website), which presents and derives the geometricoptics equations in the manner that I did in class.3. General relativity as a nonlinear field th eory in flat spacetime, and its use toderive the evolution laws for the mass, momentum, and angular momentumof a semi-isolated body.a. I suggest begi nning by reading MTW chapter 1 9 (“Mass and Angular Momentum ofa Gravitating System”) and Secs. 20.1 –20.5 (nonlinear field theory and derivation ofevolution laws).b. Having read MTW, I suggest reading pages 341–344 of Sec. 100 (“The energy-momentum pseudotensor”) of Landau and Lifschitz, The Classical Theory of Fields(revised second edition, 1962; in a later edition this might be section 10 1 and differ-ent page numbers). This sketches a derivatio n of the nonliner field theory equations1that I presented in class and that are discussed in MTW — though in a somewhatdifferent notation than I used in class and than MTW.c. The nonlinear field theory equations and evolution equations are written in a handoutthat I passed out in class, titled “Landau-Lifshitz Formulati o n of the Einstein FieldEquations”. That handout is on our website immediately after this Assignment 10 .Supplementary Reading on GW Stress-Energy Tensor4. For computation of the energy, linear momentum, and angular momentum carried bygravita tional waves, as integrals over a sphere surrounding the source, with the answersexpressed as sums over the source’s multipole moments, see Thorne, Reviews of ModernPhysics , 52, 299 (1980), Sections 4B,C,D (pages 317–319).5. For a beautiful computation of the energy flux in a gravitational wave based on ananalysis o f the energy extracted from the wave by a dense collection of mechanicaloscillators, see Sec. 9.4 of Schutz, A First Course in General RelativitySupplementary Reading on Geometric Optics:6. Sections 6.2 and 6.3 of Version 0406.3.K.pdf of Chapter 6 of Blandford and Thorne,avai lable at http://www.pma.cal tech.edu/Courses/ph136/yr2 004/ . This treats geo-metric optics for most any type of wave (electromagnetic waves in dielectric media,sound waves in sol ids such as the interior of the earth, sound waves in fluids, ...).Supplementary Reading on Appli c ations of the Nonlinear Field Theory For-mulation of General Relativity:7. MTW Sec. 20.6 on “Equations of Motion Derived from Field Equations”. This material[due to John Wheeler] describes the conceptual foundations for the derivation of the lawsof motion and precession of a self-graviting body (e.g., a black hole) moving throughcurved spacetime; and it uses those foundations to show that [if one ig nores couplingof the body’s multipol e moments to the external spacetime curvature], the body movesalong a geodesic.8. Kip S. Thorne and James B. Hartle, “Laws of Mot ion and Precession for Bl ack Holesand Other Bodies”, Physical Review D, 31, 1815 (1985). This paper combines theLandau-Lifshitz formalism (general relativity as a field theory in flat spacetime; Refs.3.b and 3.c above) with the conceptual foundations for laws of motion given in MTW(Ref. 5 above), to derive the actual laws and equations of motion and precession forcompact bodies such as neutron stars and black holes.9. Kip S. Thorne and Yekta G¨ursel, “The Free Precession of Slowly Rotating NeutronStars: Rigid-Body Moti on in General Relativi ty”, Monthly Notices of the Royal Astro-nomical Society, 205, 809 (1983). This paper uses the Landau-Lifshitz formalism toprove that t he eq uat ions of free precession for a slowly and rigidly rotating body areindependent of the strength of the body’s internal gravity.Problems [Each problem is worth 10 points unless otherwise indicated. The maximumnumber of points you can get from this set is 50 points plus whatever you earn for problem9.]1. Stress-Energy Tensor for a Pla ne Gravitational Wave in terms of h+and h×2a. In MTW it is shown that, in any Lorenz g auge (¯hαβ|β= 0) in which¯hαβhas beenmade traceless by a further gauge specialization (e.g., in TT gauge), the wave’sstress-energy tensor has the formTGWµν=132πh¯hαβ|µ¯hαβ|νi . (6)a. Consider a pla ne gravitational wave propagating in the z direction as seen in somelocal Lorentz reference frame. Show that the wave’s stress-energy tensor in this casehas as its only nonzero comp onent sT00GW= T0zGW= Tz0GW= TzzGW=116πh˙h2++˙h2×i , (7)where the dots mean ∂/∂t.b. Show that, in the language of problem 6 o f Assignment 8, these waves’ energy densityand flux have boost weight two (i.e. under a boost along the propagation direction,their


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