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IEVref: | 102-03-44 | ID: | |

Language: | en | Status: Standard | |

Term: | tensor product, <of two tensors> | ||

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Definition: | tensor of the fourth order defined by the four-linear form equal to the product of the bilinear forms defining two tensors of the second order on the same Euclidean space Note 1 to entry: The components of the tensor product of the tensors $T$ and $S$ are: ${(T\otimes S)}_{ijkl}={T}_{ij}{S}_{kl}$. Note 2 to entry: The tensor product of two tensors is denoted by $T\otimes S$. | ||

Publication date: | 2008-08 | ||

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Internal notes: | 2017-02-20: Editorial revisions in accordance with the information provided in C00019 (IEV 102) - evaluation. JGO | ||

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Note 1 to entry: The components of the tensor product of the tensors $T$ and $S$ are: ${(T\otimes S)}_{ijkl}={T}_{ij}{S}_{kl}$.

Note 2 to entry: The tensor product of two tensors is denoted by $T\otimes S$.