Einstein's Theory of General Relativity: Difference between revisions
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Einstein's Theory of General Relativity described gravity in the most detailed and accurate way that has ever been described. | (Created by William Xia) | ||
Einstein's Theory of General Relativity described gravity in the most detailed and accurate way that has ever been described. Multiple observations of the theory has been tested and experimentally verified, and new predictions have been observed through solving the equations in this theory. | |||
==The Main Idea== | ==The Main Idea== | ||
Gravity is the result of energy and matter distorting space and | Gravity is the result of energy and matter distorting spacetime. The reason why one follows a curved trajectory when encountering an object in space is because the trajectory follows a least energy path through spacetime. In other words, if the smallest distance between two points in a plane is a straight line, then the smallest distance between two points in spacetime is described by how the object bends spacetime. | ||
===Mathematical Framework=== | |||
Einstein developed a generalized coordinate system and summation notation to simplify his work and create a much more elegant system to describe his ideas. There are four important quantities to understand before tackling the Einstein Field Equations: metric tensor, christoffel symbols, geodesic equation, and the reimann tensor. | |||
Metric Tensor | |||
The metric tensor is a very important mathematical object in general relativity. Much of the information that describes a space is encoded in this quantity. | |||
Christoffel Symbols | |||
Christoffel symbols can be loosely thought of as a residual when taking the derivative in a nonlinear coordinate system. If the coordinate system itself depends on a set of parameters, then taking the derivative of a function will not result in a simple derivative. Because of the product rule, there remains a correction term that must be required, and such term is the christoffel symbol. With respect to the metric tensor, the christoffel symbol has a concrete description of the tensor, and represents the correction quantity that must be used to describe geodesics, or shortest paths. | |||
Geodesic Equation | |||
The geodesic equation describes the path a particle takes in a general coordinate system, and it is a generalization of acceleration equations. For flat space, or simple cartesian coordinates, if a particle moves then it must move in a straight line disregarding any external forces, and indeed the geodesic equation resembles newton's second law. However, for curved space, say for example a sphere, the shortest path between to points is actually curved. When massive objects distort spacetime, the geodesic equation is helpful in describing paths particles must take in the distorted coordinate frame. Within the mathematical framework, the geodesic equation employs the christoffel symbol to correct for distortions in spacetime. | |||
===A Computational Model=== | ===A Computational Model=== | ||
==Examples== | ==Examples== | ||
| Line 38: | Line 50: | ||
==History== | ==History== | ||
Einstein spent nearly 10 years refining his theory before he published his work. | Einstein spent nearly 10 years refining his theory before he published his work. 1907,1912 | ||
== See also == | == See also == | ||
| Line 54: | Line 66: | ||
==References== | ==References== | ||
Einstein, Albert. Relativity: The Special and General Theory. Methuen & Co Ltd, 1916. Print. | |||
[[Category:Which Category did you place this in?]] | [[Category:Which Category did you place this in?]] | ||
Revision as of 14:23, 4 December 2015
(Created by William Xia)
Einstein's Theory of General Relativity described gravity in the most detailed and accurate way that has ever been described. Multiple observations of the theory has been tested and experimentally verified, and new predictions have been observed through solving the equations in this theory.
The Main Idea
Gravity is the result of energy and matter distorting spacetime. The reason why one follows a curved trajectory when encountering an object in space is because the trajectory follows a least energy path through spacetime. In other words, if the smallest distance between two points in a plane is a straight line, then the smallest distance between two points in spacetime is described by how the object bends spacetime.
Mathematical Framework
Einstein developed a generalized coordinate system and summation notation to simplify his work and create a much more elegant system to describe his ideas. There are four important quantities to understand before tackling the Einstein Field Equations: metric tensor, christoffel symbols, geodesic equation, and the reimann tensor.
Metric Tensor
The metric tensor is a very important mathematical object in general relativity. Much of the information that describes a space is encoded in this quantity.
Christoffel Symbols
Christoffel symbols can be loosely thought of as a residual when taking the derivative in a nonlinear coordinate system. If the coordinate system itself depends on a set of parameters, then taking the derivative of a function will not result in a simple derivative. Because of the product rule, there remains a correction term that must be required, and such term is the christoffel symbol. With respect to the metric tensor, the christoffel symbol has a concrete description of the tensor, and represents the correction quantity that must be used to describe geodesics, or shortest paths.
Geodesic Equation
The geodesic equation describes the path a particle takes in a general coordinate system, and it is a generalization of acceleration equations. For flat space, or simple cartesian coordinates, if a particle moves then it must move in a straight line disregarding any external forces, and indeed the geodesic equation resembles newton's second law. However, for curved space, say for example a sphere, the shortest path between to points is actually curved. When massive objects distort spacetime, the geodesic equation is helpful in describing paths particles must take in the distorted coordinate frame. Within the mathematical framework, the geodesic equation employs the christoffel symbol to correct for distortions in spacetime.
A Computational Model
Examples
Simple
Middling
Difficult
Connectedness
How is this topic connected to something that you are interested in?
I have always been fascinated by how gravity can be described in a rigorous mathematical sense, and the revolutionary nature of Einstein's work.
How is it connected to your major?
Electrical Engineers, when designing satellites, have to take into account the effects of GR in order to produce accurate time measurements. Recent experiments have also sought to measure minuscule changes in length and time due to gravitational waves and high velocities.
Is there an interesting industrial application?
For now, GR is restricted to mostly space applications. Away from the Earth's gravity, residents or machines orbiting the earth or traveling through space experience different effects on time and space due to fluctuating gravitational fields.
History
Einstein spent nearly 10 years refining his theory before he published his work. 1907,1912
See also
Further reading
External links
References
Einstein, Albert. Relativity: The Special and General Theory. Methuen & Co Ltd, 1916. Print.