Levi-Civita symbol: Difference between revisions

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imported>Peter Schmitt
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The '''Levi-Civita symbol''', usually denoted as &epsilon;<sub>''ijk''</sub>, is a notational convenience (similar to the [[Kronecker delta]] &delta;<sub>''ij''</sub>). Its value is:
The '''Levi-Civita symbol''', usually denoted as &epsilon;<sub>''ijk''</sub>, is a notational convenience (similar to the [[Kronecker delta]] &delta;<sub>''ij''</sub>). Its value is:
* equal to 1, if the indices are pairwise distinct and in [[cyclic order]],<ref name=cyclic>
* equal to 1, if the indices are pairwise distinct and in [[cyclic order]],<!--<ref name=cyclic>


The term "cyclic order" imagines the items in a list, say ''a, b, c, ...'' arranged in a circle. Then all sequences that could be encountered by going once around the circle in the direction of the sequence ''a, b, c, ...'' are in cyclic order, regardless of the starting point. See {{cite book |title=An exercise book in algebra |author=Scoby McCurdy |url=http://books.google.com/books?id=0RMAAAAAYAAJ&pg=PA59 |pages=p. 59 |chapter=Cyclic order |year=1894 |publisher=D. C. Heath & Co.}}
The term "cyclic order" imagines the items in a list, say ''a, b, c, ...'' arranged in a circle. Then all sequences that could be encountered by going once around the circle in the direction of the sequence ''a, b, c, ...'' are in cyclic order, regardless of the starting point. See {{cite book |title=An exercise book in algebra |author=Scoby McCurdy |url=http://books.google.com/books?id=0RMAAAAAYAAJ&pg=PA59 |pages=p. 59 |chapter=Cyclic order |year=1894 |publisher=D. C. Heath & Co.}}


</ref>
</ref>-->
* equal to &minus;1, if the indices are pairwise distinct but not in cyclic order, and
* equal to &minus;1, if the indices are pairwise distinct but not in cyclic order, and
* equal to 0, if two of the indices are equal.
* equal to 0, if two of the indices are equal.

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The Levi-Civita symbol, usually denoted as εijk, is a notational convenience (similar to the Kronecker delta δij). Its value is:

  • equal to 1, if the indices are pairwise distinct and in cyclic order,
  • equal to −1, if the indices are pairwise distinct but not in cyclic order, and
  • equal to 0, if two of the indices are equal.

Thus


Remarks:

The Levi-Civita symbol—named after the Italian mathematician and physicist Tullio Levi-Civita—mainly occurs in differential geometry and mathematical physics where it is used to define the components of the (three-dimensional) Levi-Civita (pseudo)tensor that conventionally is also denoted by εijk.

The symbol changes sign whenever two of the indices are interchanged.

The Levi-Civita symbol equals the sign of the permutation (ijk). Therefore it is also called (Levi-Civita) permutation symbol.

The symbol can be generalized to n-dimensions, to become the n-index symbol εijk...r completely antisymmetric in its indices, and with ε123...n = 1. More specifically, the symbol is has value 1 for even permutations of the n indices, value −1 for odd permutations, and value 0 otherwise.[1]

Notes

  1. For example, see Hans-Jurgen Weber, George Brown Arfken (2004). Essential mathematical methods for physicists, 5th ed. Academic Press, p. 164. ISBN 0120598779.