Levi-Civita symbol: Difference between revisions

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The '''Levi-Civita symbol''', usually denoted as &epsilon;<sub>''ijk''</sub>, is a conventional abbreviation
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:
(similar to the [[Kronecker delta]] &delta;<sub>''ij''</sub>).
It equals either 1, &minus;1, or 0 depending on the values (1, 2, or 3) taken by the indices ''i'', ''j'', and ''k''.
It is
* equal to 1, if the indices are pairwise distinct and in [[cyclic order]],
* equal to 1, if the indices are pairwise distinct and in [[cyclic order]],
* 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
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The symbol changes sign whenever two of the indices are interchanged.
The symbol changes sign whenever two of the indices are interchanged.


The Levi-Civita symbol is a special case (for ''n''=3, because it involves three indices) of a more general notion:
The Levi-Civita symbol equals the sign of the [[permutation]] (''ijk''). Therefore it is also called (Levi-Civita) ''permutation symbol''.
<br>&nbsp;&nbsp; It equals the sign of the [[permutation]] (''ijk''). Therefore it is also called (Levi-Civita) ''permutation symbol''.


The Levi-Civita symbol is used in the definiton of the [[Levi-Civita tensor]] that is also denoted as denoted as &epsilon;<sub>''ijk''</sub>.
The Levi-Civita symbol is used in the definition of the [[Levi-Civita tensor]] that has components denoted as &epsilon;<sub>''ijk''</sub>.


The symbol can be generalized to ''n''-dimensions, as completely antisymmetric in its indices with &epsilon;<sub>123...''n''</sub>&nbsp;=&nbsp;1. More specifically, the symbol is one for even [[Permutation group|permutations]] of the indices, −1 for odd permutations, and 0 otherwise.
The symbol can be generalized to ''n''-dimensions, to become the ''n''-index symbol &epsilon;<sub>''ijk...r''</sub> completely antisymmetric in its indices, and with &epsilon;<sub>123...''n''</sub>&nbsp;=&nbsp;1. More specifically, the symbol is has value 1 for even [[Permutation group|permutations]] of the ''n'' indices, value −1 for odd permutations, and value 0 otherwise.


Both the symbol and the tensor are named after the Italian mathematician and physicist [[Tullio Levi-Civita]].  
Both the symbol and the tensor are named after the Italian mathematician and physicist [[Tullio Levi-Civita]].  


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{{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.}}
 
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Revision as of 22:14, 2 January 2011

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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 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 Levi-Civita symbol is used in the definition of the Levi-Civita tensor that has components denoted as εijk.

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.

Both the symbol and the tensor are named after the Italian mathematician and physicist Tullio Levi-Civita.