The tensor product of Hilbert spaces

Recall that $(e_k)_{k\in\mathbb{N}}$ is the canonical basis of $H=\ell^2(\mathbb{N})$ . The space $H\tens H$ is the collection of sequences $(x_{np})_{n,p\in\mathbb{N}}$ of complex numbers such that:

∑	\| x_np \| ²
n,p

converges. The scalar product is defined just as before:

$\langle (x_{np}), (y_{np})\rangle = \sum_{n,p} x_{np}\bar y_{np}$ .

If $x = (x_n)_{n\in\mathbb{N}}$ and $y = (y_p)_{p\in\mathbb{N}}$ are vectors in $H$ then their tensor is the sequence:

$x\tens y = (x_ny_p)_{n,p\in\mathbb{N}}$ .

In particular if we define: $e_{np} = e_n\tens e_p$ so that $e n p$ is the (doubly indexed) sequence of complex numbers given by $e n p i j = δ n i δ p j$ then $(e n p)$ is a hilbertian basis of $H\tens H$ : the sequence $x = (x n p)$ may be written:

$x = \sum_{n,p\in\mathbb{N}}x_{np}\,e_{np} = \sum_{n,p\in\mathbb{N}}x_{np}\,e_n\tens e_p$ .

By bilinearity of tensor we have:

$x\tens y = \left(\sum_n x_ne_n\right)\tens\left(\sum_p y_pe_p\right) = \sum_{n,p} x_ny_p\, e_n\tens e_p = \sum_{n,p} x_ny_p\,e_{np}$

GoI for MELL: exponentials

The tensor product of Hilbert spaces

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