| 1. | Using the standard basis the exterior product of a pair of vectors
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| 2. | Going forward, I would hope to put things on a more standard basis.
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| 3. | Using the standard basis, in index and abbreviated notations, the contravariant components are:
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| 4. | For example, the standard basis for R ^ 2 would be
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| 5. | This then creates a set of orthogonal standard basis vectors.
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| 6. | For discrete it means that all elements of the standard basis are eigenvectors of.
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| 7. | Of particular interest are the unit bivectors formed from the products of the standard basis.
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| 8. | Then, Ax is the i-th standard basis vector, and hence x \ geq 0 by monotonicity.
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| 9. | The standard basis of the real-space is orthogonal.
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| 10. | The matrix of the associated sesquilinear form ( with respect to the standard basis ) is:
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