General Relativity/The Tensor Product

<General Relativity

If ${\displaystyle 𝐓}$ and ${\displaystyle 𝐒}$ are tensors of rank ${\displaystyle n}$ and ${\displaystyle m}$, then there exists a tensor ${\displaystyle 𝐓\otimes 𝐒}$ of rank ${\displaystyle n+m}$. The components of the new tensor (pronounced "T tensor S") are obtained by multiplying the components of the old tensors. In other words, if ${\displaystyle 𝐓=T_{\beta }^{\alpha }}$ and ${\displaystyle 𝐒=S_{\mu \nu },}$then ${\displaystyle 𝐓\otimes 𝐒=T_{\beta }^{\alpha }{S}_{\mu \nu }}$.

For example, if T and S are two contravariant, one-rank tensors, then their tensor product is a two-rank, contravariant tensor.

More to come...

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