Talk:PlanetPhysics/Affine Connection
Original TeX Content from PlanetPhysics Archive
edit%%% This file is part of PlanetPhysics snapshot of 2011-09-01 %%% Primary Title: affine connection %%% Primary Category Code: 02.40.Hw %%% Filename: AffineConnection.tex %%% Version: 1 %%% Owner: rspuzio %%% Author(s): rspuzio %%% PlanetPhysics is released under the GNU Free Documentation License. %%% You should have received a file called fdl.txt along with this file. %%% If not, please write to gnu@gnu.org. \documentclass[12pt]{article} \pagestyle{empty} \setlength{\paperwidth}{8.5in} \setlength{\paperheight}{11in}
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An affine connection is a connection defined on the tangent bundle of a \htmladdnormallink{manifold}{http://planetphysics.us/encyclopedia/NoncommutativeGeometry4.html}. Such connections enjoy many properties which are not true of connections on other bundles. The reason for this goes back to the fact that to define a connection, one needs to consider two \htmladdnormallink{vector spaces}{http://planetphysics.us/encyclopedia/NormInducedByInnerProduct.html}, the \htmladdnormallink{tangent space}{http://planetphysics.us/encyclopedia/BilinearMap.html} and the fiber space. In the case of an affine connection, these two spaces are the same, and this leads to possibilities which one would not have when the spaces were distinct.
Perhaps the most important property of affine connections is that they allow one to define \htmladdnormallink{geodesics}{http://planetphysics.us/encyclopedia/GeodesicEquation.html}. Because the defining equation of a geodesic involves the covariant derivative of a tangent \htmladdnormallink{vector field}{http://planetphysics.us/encyclopedia/NeutrinoRestMass.html}, only affine connections give rise to geodesics. Furthermore, the converse is true: An affine connection is uniquely determined by the set of its geodesic curves.
Given an affine connection, one can obtain another affine connection by interchanging the role of the \htmladdnormallink{vector}{http://planetphysics.us/encyclopedia/Vectors.html} which specifies direction of parallel transport and the vector being transported. In local coordinates, an expression for this new connection is $${C'}^i_{jk} = C^i_{kj}$$ Since the difference of two connections is a \htmladdnormallink{tensor field}{http://planetphysics.us/encyclopedia/HamiltonianAlgebroid3.html}, one has a tensor field, known as the torsion \htmladdnormallink{tensor}{http://planetphysics.us/encyclopedia/Tensor.html}, associated to every affine connection. $$T^i_{jk} = C^i_{jk} - C^i_{kj}$$
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