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by hackandthink 1020 days ago
It's in the text:

"The tensor product itself captures all ways that basic things can 'interact' with each other!"

Tensor Product is also the way to go when combining classical probabilistic systems.

And you need the tensor product already for pure states in QM.

(mixed states need density matrices)
1 comments
sigmoid10 1019 days ago
>The tensor product itself captures all ways that basic things can 'interact' with each other!

In quantum physics, "interacting" usually has a different meaning. So one should use these terms more carefully.

>And you need the tensor product already for pure states in QM.

No. Pure states are just vectors (or more precise: rays) in Hilbert space. The usual inner product is sufficient to work with them. An outer (=tensor) product of these states will just give you a density matrix with tr(ρ^2)=1.

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hackandthink 1018 days ago
"Product states are multipartite quantum states that can be written as a tensor product"

"In the special case of pure states the definition simplifies: a pure state is separable if and only if it is a product state."

https://en.wikipedia.org/wiki/Separable_state

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sigmoid10 1018 days ago
Keyword is can. There's a reason why most university level physics curricula defer quantum density matrices (and by extension tensor algebra) to more advanced classes. There's a lot of mathematical legwork required before you can actually make use of that.
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