| 1. | In relativity, the electromagnetic field tensor more natural.
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| 2. | The electromagnetic field tensor displays the manifestly covariant mathematical structure of the electromagnetic field.
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| 3. | This is how the electromagnetic field tensor decomposes into electric and magnetic field vectors.
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| 4. | This latter form is sometimes preferred; e . g ., for the electromagnetic field tensor.
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| 5. | "Path curvature " is the reciprocal of the magnitude of the electromagnetic field tensor.
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| 6. | This is called the electromagnetic field tensor, usually written as " F " ??.
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| 7. | The electromagnetic field at any point in spacetime is described by the antisymmetric ( 0, 2 )-rank electromagnetic field tensor
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| 8. | An alternative unification of descriptions is to think of the physical entity as the electromagnetic field tensor, as described later on.
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| 9. | :From a relativistic perspective, the " electric field " and " magnetic field " are just different aspects of the electromagnetic field tensor.
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| 10. | For example, in the case of the gauge group U ( 1 ), " F " will be the electromagnetic field tensor.
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