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Special Relativity - http://www2.slac.stanford.edu/vvc/theory/relativity.html
A brief overview of the theory of special relativity, and how it pertains to particles at SLAC (Stanford Linear Accelerator) |
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On the Electrodynamics of Moving Bodies - http://www.fourmilab.ch/etexts/einstein/specrel/www/
Albert Einstein's first paper on relativity, translated here from Annalen der Physik vol XVII 1905 p. 891-921, is of historical interest. |
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Special Relativity - http://casa.colorado.edu/~ajsh/sr/sr.shtml
Tutorial explains about the postulates, paradox, simulaneity, time dilation, Lorentz transformation constructions, spacetime wheel, and the Fitzgerald-Lorentz contraction. Page includes some animated illustrations. |
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How Do You Add Velocities in Special Relativity? - http://math.ucr.edu/home/baez/physics/Relativity/SR/velocity.html
Here is the formula for adding velocities in special relativity when motion occurs in a single direction. |
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On the Electrodynamics of Moving Bodies (Part B: Electrodynamics), and its Corollary, E=mc˛, by Albert Einstein - http://www.sigmapisigma.org/radiations/2006/ecp_s06.pdf
This is part 2 of Dwight E. Neuenschwander's annotation of Einstein's legendary paper. |
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A Special Relativity Paradox: The Barn and the Pole - http://www.math.ucr.edu/home/baez/physics/Relativity/SR/barn_pole.html
The answer to the famous barn and the pole paradox is that the two doors are never closed at the same time in the runner's frame of reference. |
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Santa at Nearly the Speed of Light - http://www.fnal.gov/pub/ferminews/santa/
An estimate of the speed and distances covered by Santa Claus on Christmas night. The physics is unassailable. The article is hosted on the Fermi National Accelerator Laboratory website. |
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How Stuff Works: Special Relativity - http://www.howstuffworks.com/relativity.htm
The major principles of special relativity (SR) are discussed in an accessible way, via 5 segments, to help you understand the lingo and theories involved. |
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Special Relativity Lecture Notes - http://www.phys.vt.edu/~takeuchi/relativity/notes
A standard introduction to special relativity where explanations are based on pictures called spacetime diagrams. |
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Special Relativity - http://www.motionmountain.net/download.html
Download Christoph Schiller's 1612 page walk through the whole of physics, from classical mechanics to relativity, electrodynamics, thermodynamics, quantum theory, nuclear physics and unification. chapter 2 explains special relativity. |
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Commutative Hypercomplex Special Relativity - http://home.comcast.net/%7ecmdaven/special.htm
Einstein's special relativity is formulated in terms of 4-D commutative hypercomplex mathematics. The traditional results are obtained, but some additional effects are suggested. |
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A Derivation of the Lorentz Transformation From a Simple Definition of Time - http://www.everythingimportant.org/relativity/special.pdf
The fundamental equations of special relativity are derived with only high school algebra and toy universes consisting of moving rulers. |
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Uniform Acceleration - http://www.ph.utexas.edu/~gleeson/NotesChapter13.pdf
This paper analyzes several simple uniform acceleration problems, including the paradox of John Bell. |
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University Lectures on Special Relativity - http://www.physics.mq.edu.au/~jcresser/Phys378/LectureNotes/SpecialRelativityNotes.pdf
Lecture notes on Special Relativity, prepared by J. D. Cresser, Department of Physics, Macquarie University. 44 pages. |
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Derivation of the Lorentz Transformation - http://www2.physics.umd.edu/~yakovenk/teaching/Lorentz.pdf
This derivation uses the group property of the Lorentz transformations, which means that a combination of two Lorentz transformations also belongs to the class Lorentz transformations. |
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Space Measurements on a Rotating Platform - http://arxiv.org/abs/gr-qc/0309020
The age-old puzzling problem of Lorentz contraction on a rotating platform, i.e., Ehrenfest's paradox, is explained in its proper mathematical context. |
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Time Dilation - http://www.pa.msu.edu/courses/2000spring/PHY232/lectures/relativity/dilation.html
The gamma factor and time dilation can be derived using a very simple clock. |
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Synchronization Gauges and the Principles of Special Relativity - http://arxiv.org/abs/gr-qc/0409105
Synchronization functions set the mathematical clocks represented by the Lorentz transformation and resetting these clocks mathematically only produces a theory equivalent to special relativity in predicting empirical facts. 57 pages. |
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Imaginary In All Directions - http://arxiv.org/abs/math-ph/0309061
There is a preferred algebra of quaternions and complex numbers that is ideally suited to express the equations of special relativity and classical electrodynamics. |
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The Twin Paradox in a Spatially Closed and Bounded Universe - http://www.everythingimportant.org/relativity/general.htm
Spatially compact spacetimes break global Lorentz invariance and define absolute inertial frames of reference. |
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Special Relativity Without the 2nd Postulate - http://tosca.phys.oxy.edu/~alec/Courses/P366/Notes/LTs.pdf
It is impossible to formulate an alternative to Special Relativity while obeying the observed symmetries of spacetime and agreeing with the experimental evidence. |
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Relativity (Kinematics) - http://www.people.fas.harvard.edu/~djmorin/chap11.pdf
Chapter of a classical mechanics text describes spatiotemporal effects. Includes problems and solutions. |
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Quaternions in University-Level Physics Considering Special Relativity - http://arxiv.org/ftp/physics/papers/0308/0308017.pdf
The quaternions are an expansion of complex numbers and show close relations to numerous physically fundamental concepts (e.g. Pauli Matrices). |
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On the Electrodynamics of Moving Bodies (Part A: Kinematics) by Albert Einstein - http://www.sigmapisigma.org/radiations/2005/electrodynamics_fall05.pdf
In this annotated version of Einstein's paper, the author attempts to express Einstein's insights in familiar notation and fills in some of Einstein's many missing intermediate steps. |
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The Lecture Notes of Dr. R. D. Field - http://www.phys.ufl.edu/~rfield/PHY3063/
The online physics course notes for Physics 3063, by Professor Rick Field, University of Florida, is a good summary of many of the useful formulas used in special relativity. |