| 1. | By forming Kronecker products of matrices from the Paley construction and the 2? matrix,
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| 2. | The tensor product, outer product and Kronecker product all convey the same general idea.
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| 3. | Where \ otimes represents the Kronecker product.
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| 4. | Then, the matrix describing the tensor product is the Kronecker product of the two matrices.
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| 5. | By taking Kronecker products of with itself repeatedly, one may construct all higher irreducible representations.
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| 6. | The Kronecker product of the two gives
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| 7. | The outer product is simply the Kronecker product, limited to vectors ( instead of matrices ).
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| 8. | Thus the components of the tensor product of multilinear forms can be computed by the Kronecker product.
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| 9. | It is possible to start with multiple Kronecker products of totally symmetric second rank Lorentz tensors,.
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| 10. | Essentially the Tracy� Singh product is the pairwise Kronecker product for each pair of partitions in the two matrices.
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