| 1. | Antisymmetric tensors of rank 2 play important roles in relativity theory.
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| 2. | The symmetrical and antisymmetric zero-order modes deserve special attention.
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| 3. | For example, let us consider the first higher antisymmetric mode.
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| 4. | An antisymmetric wave function can be mathematically described as follows:
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| 5. | Conversely, an antisymmetric form is not necessarily alternating in characteristic 2.
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| 6. | A related concept is that of the antisymmetric tensor or alternating form.
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| 7. | Antisymmetric matrices can also be produced by the Paley construction.
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| 8. | The quarks in the singlet state are antisymmetric under exchange.
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| 9. | This forces the wavefunction to be antisymmetric under particle interchange.
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| 10. | An antisymmetric wave function can be mathematically described using the Slater determinant.
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