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Premium member Presentation Transcript Reissner-Nordström Metric and Charged Black Holes: Reissner-Nordström Metric and Charged Black Holes Jordan Gallagher and Jenn LeNestourReissner-Nordström Metric: Reissner-Nordström Metric Generalized Schwarzschild metric for a black hole that has An electric charge No angular momentum Reissner-Nordström Metric - Derivation: Reissner-Nordström Metric - Derivation Derivation process is similar to that of the Schwarzschild metric We assume spherical symmetry By Birkhoff’s Theorem, the metric will have the familiar form of: Reissner-Nordström Metric - Derivation: Reissner-Nordström Metric - Derivation However, we cannot set the Stress-Energy tensor to zero as in the Schwarzschild derivation There is electric charge present, and hence a non-zero Maxwell Tensor By equating the Ricci Tensor with the non-zero Maxwell Tensor, and after working through a lot of math, one arrives at the Reissner-Nordström MetricWhat is a Black Hole?: What is a Black Hole? Object with a very large gravitational field To escape you must be traveling faster than the speed of light Since no light escapes, black holes will always appear darkStatic Black Hole Structure: Static Black Hole Structure Photon Sphere at 1.5 RS Singularity in the centre Event Horizon at RS No electric charge, no angular momentumStatic Black Hole Structure: Static Black Hole Structure Photon Sphere Lowest possible orbit around a black hole Speed of c required to maintain orbit Light will orbit temporarily Orbits usually disturbed by other photons or particles and the photons will fall to the event horizon No electric charge, no angular momentumStatic Black Hole Structure: Static Black Hole Structure Singularity Black hole’s mass is compressed into a region with zero volume Density, gravitational pull, and curvature of space-time are then infinite Can be thought of as a “place in time” since space and time change roles at the event horizon No electric charge, no angular momentumStatic Black Hole Structure: Static Black Hole Structure Event Horizon Physically “Point of no return” Nothing that passes this sphere can return Required escape velocity greater than c Time and space effectively switch roles No electric charge, no angular momentumStatic Black Hole Structure: Static Black Hole Structure Event Horizon Mathematically Coordinate singularity of the metric Can choose alternate coordinates (Eddington-Finkelstein) to show it isn’t a physical singularity Point after which the coefficients of dr and dt change signs No electric charge, no angular momentumEvent Horizons: Event Horizons The “Horizon Function” H(r) is given by, H(r) = (1 - 2M/r + Q2/r2) and is quadratic with 2 distinct roots These two roots are given by; r+ = M + (M2 + Q2)1/2 r- = M + (M2 + Q2)1/2 These two roots correspond to two different event horizons, one at r+ and the other at r- Event Horizons: Event Horizons Schwarzschild black hole r+ = 2M r- = 0 Reissner-Nordström black hole r+ = M + (M2 + Q2)1/2 = 2M – f(Q,M) r- = M - (M2 + Q2)1/2 = 0 + f(Q,M)Event Horizons: Event Horizons The outer horizon at r+ is much like the event horizon of 2M for a Schwarzschild black hole Space and time change roles upon crossing the outer horizon as “normal” At the inner horizon, also known as the Cauchy horizon, something remarkable happens, the space and time co-ordinates change roles again. Inside the Cauchy horizon, time and space behave as “normal”, and the singularity is space-likeSpacetime Diagram for an R-N Black Hole: Spacetime Diagram for an R-N Black Hole Yellow = Radially inward light rays Orange = Radially outward light rays Purple (-) = Constant Time Purple (|) = Constant Radius Red = Event HorizonsEntering a Black Hole: Entering a Black Hole Static Once past the event horizon, you would be stretched due to tidal forces Due to time-space changing roles, the singularity is a point in time, and cannot be avoided As you approached the singularity the gravitational force will increase and you will be torn apart You become part of the black hole Entering a Black Hole: Entering a Black Hole Penrose Diagram Space-time diagram Shows movement in a black holeEntering a Black Hole: Entering a Black Hole Reissner-Nordstrom You would still be broken apart by the tidal forces Within the Outer Horizon the singularity would appear as a place in time Within the Inner Horizon time and space change roles again and so the singularity appears as a place in space, which is avoidable Entering a Black Hole: Entering a Black Hole Reissner-Nordstrom Possible to pass “through” the singularity Find yourself in another black hole Would cross both event horizons and end up with the same velocity leaving as you did entering mirror-image of your worldline Entering a Black Hole: Entering a Black Hole Penrose Diagram Space-time diagram Shows movement in a black hole Possible to transfer into other UniversesDo Black Holes Exist Without Angular Momentum?: Do Black Holes Exist Without Angular Momentum? Black Hole Formation Gravitational collapse of a star Collisions between neutron stars Pressure from the Big Bang (small Primordial Black Holes) Black holes can then absorb mass from interstellar gas and dust, as well as other stars and planets to become larger Do Black Holes Exist Without Angular Momentum?: Do Black Holes Exist Without Angular Momentum? All of these methods will result in a black hole with some angular momentum Black holes with no angular momentum are only theoretical Existence of Charged Black Holes: Existence of Charged Black Holes Electric charge, over large scales, is pretty effective at “neutralizing” itself That is, macroscopic objects, especially astrophysical ones, tend to be electrically neutral The size of the Cauchy horizon depends directly on the magnitude of the charge of the black hole For a 3 solar mass black hole, a charge of ~ 1019 C is required to create a Cauchy horizon of radius 0.001M Such a charge would require ~1038 electrons, and the resultant electric field would rip apart atoms with the greatest of easeDo Reissner-Nordström Black Holes Exist?: Do Reissner-Nordström Black Holes Exist? No, they are just theoretical! You do not have the permission to view this presentation. In order to view it, please contact the author of the presentation.
3A03 Presentation Reissner Nordstrom Metric Dixon Download Post to : URL : Related Presentations : Share Add to Flag Embed Email Send to Blogs and Networks Add to Channel Uploaded from authorPOINTLite Insert YouTube videos in PowerPont slides with aS Desktop Copy embed code: (To copy code, click on the text box) Embed: URL: Thumbnail: WordPress Embed Customize Embed The presentation is successfully added In Your Favorites. Views: 425 Category: Entertainment License: All Rights Reserved Like it (0) Dislike it (0) Added: November 29, 2007 This Presentation is Public Favorites: 0 Presentation Description No description available. Comments Posting comment... Premium member Presentation Transcript Reissner-Nordström Metric and Charged Black Holes: Reissner-Nordström Metric and Charged Black Holes Jordan Gallagher and Jenn LeNestourReissner-Nordström Metric: Reissner-Nordström Metric Generalized Schwarzschild metric for a black hole that has An electric charge No angular momentum Reissner-Nordström Metric - Derivation: Reissner-Nordström Metric - Derivation Derivation process is similar to that of the Schwarzschild metric We assume spherical symmetry By Birkhoff’s Theorem, the metric will have the familiar form of: Reissner-Nordström Metric - Derivation: Reissner-Nordström Metric - Derivation However, we cannot set the Stress-Energy tensor to zero as in the Schwarzschild derivation There is electric charge present, and hence a non-zero Maxwell Tensor By equating the Ricci Tensor with the non-zero Maxwell Tensor, and after working through a lot of math, one arrives at the Reissner-Nordström MetricWhat is a Black Hole?: What is a Black Hole? Object with a very large gravitational field To escape you must be traveling faster than the speed of light Since no light escapes, black holes will always appear darkStatic Black Hole Structure: Static Black Hole Structure Photon Sphere at 1.5 RS Singularity in the centre Event Horizon at RS No electric charge, no angular momentumStatic Black Hole Structure: Static Black Hole Structure Photon Sphere Lowest possible orbit around a black hole Speed of c required to maintain orbit Light will orbit temporarily Orbits usually disturbed by other photons or particles and the photons will fall to the event horizon No electric charge, no angular momentumStatic Black Hole Structure: Static Black Hole Structure Singularity Black hole’s mass is compressed into a region with zero volume Density, gravitational pull, and curvature of space-time are then infinite Can be thought of as a “place in time” since space and time change roles at the event horizon No electric charge, no angular momentumStatic Black Hole Structure: Static Black Hole Structure Event Horizon Physically “Point of no return” Nothing that passes this sphere can return Required escape velocity greater than c Time and space effectively switch roles No electric charge, no angular momentumStatic Black Hole Structure: Static Black Hole Structure Event Horizon Mathematically Coordinate singularity of the metric Can choose alternate coordinates (Eddington-Finkelstein) to show it isn’t a physical singularity Point after which the coefficients of dr and dt change signs No electric charge, no angular momentumEvent Horizons: Event Horizons The “Horizon Function” H(r) is given by, H(r) = (1 - 2M/r + Q2/r2) and is quadratic with 2 distinct roots These two roots are given by; r+ = M + (M2 + Q2)1/2 r- = M + (M2 + Q2)1/2 These two roots correspond to two different event horizons, one at r+ and the other at r- Event Horizons: Event Horizons Schwarzschild black hole r+ = 2M r- = 0 Reissner-Nordström black hole r+ = M + (M2 + Q2)1/2 = 2M – f(Q,M) r- = M - (M2 + Q2)1/2 = 0 + f(Q,M)Event Horizons: Event Horizons The outer horizon at r+ is much like the event horizon of 2M for a Schwarzschild black hole Space and time change roles upon crossing the outer horizon as “normal” At the inner horizon, also known as the Cauchy horizon, something remarkable happens, the space and time co-ordinates change roles again. Inside the Cauchy horizon, time and space behave as “normal”, and the singularity is space-likeSpacetime Diagram for an R-N Black Hole: Spacetime Diagram for an R-N Black Hole Yellow = Radially inward light rays Orange = Radially outward light rays Purple (-) = Constant Time Purple (|) = Constant Radius Red = Event HorizonsEntering a Black Hole: Entering a Black Hole Static Once past the event horizon, you would be stretched due to tidal forces Due to time-space changing roles, the singularity is a point in time, and cannot be avoided As you approached the singularity the gravitational force will increase and you will be torn apart You become part of the black hole Entering a Black Hole: Entering a Black Hole Penrose Diagram Space-time diagram Shows movement in a black holeEntering a Black Hole: Entering a Black Hole Reissner-Nordstrom You would still be broken apart by the tidal forces Within the Outer Horizon the singularity would appear as a place in time Within the Inner Horizon time and space change roles again and so the singularity appears as a place in space, which is avoidable Entering a Black Hole: Entering a Black Hole Reissner-Nordstrom Possible to pass “through” the singularity Find yourself in another black hole Would cross both event horizons and end up with the same velocity leaving as you did entering mirror-image of your worldline Entering a Black Hole: Entering a Black Hole Penrose Diagram Space-time diagram Shows movement in a black hole Possible to transfer into other UniversesDo Black Holes Exist Without Angular Momentum?: Do Black Holes Exist Without Angular Momentum? Black Hole Formation Gravitational collapse of a star Collisions between neutron stars Pressure from the Big Bang (small Primordial Black Holes) Black holes can then absorb mass from interstellar gas and dust, as well as other stars and planets to become larger Do Black Holes Exist Without Angular Momentum?: Do Black Holes Exist Without Angular Momentum? All of these methods will result in a black hole with some angular momentum Black holes with no angular momentum are only theoretical Existence of Charged Black Holes: Existence of Charged Black Holes Electric charge, over large scales, is pretty effective at “neutralizing” itself That is, macroscopic objects, especially astrophysical ones, tend to be electrically neutral The size of the Cauchy horizon depends directly on the magnitude of the charge of the black hole For a 3 solar mass black hole, a charge of ~ 1019 C is required to create a Cauchy horizon of radius 0.001M Such a charge would require ~1038 electrons, and the resultant electric field would rip apart atoms with the greatest of easeDo Reissner-Nordström Black Holes Exist?: Do Reissner-Nordström Black Holes Exist? No, they are just theoretical!