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Consider \(S_{\mu\nu}\) to be a second rank tensor having the following properties:
- \(S_{\mu\nu}\) is symmetric : \( S_{\mu\nu} = S_{\nu\mu} \);
- \(S_{\mu\nu}\) is antisymmetric : \( S_{\mu\nu} = - S_{\nu\mu} \);
- \(S\) is traceless:\( g^{\mu\nu} S_{\mu\nu} = 0\).
Show that the above properties are remain invariant under Lorentz transformations.
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4727:Diamond Point
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