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Tomasz Kania
Tomasz Kania
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One question about the tensor product of L^1$L^1(G)$ and a banachBanach space A$A$

We know that the tensor product of L^1(G)$L^1(G)$ and a banachBanach space A$A$ is L^1(G, A)isometric to (The$L^1(G, A)$, the space of integrable Aall Bochner-integrable $A$-valued functions on a locally compact group G)$G$. I searcham looking for a proof of it,this fact but I can not tocannot find it.Does Does anyone have proof of it.?

One question about tensor product of L^1(G) and a banach space A

We know the tensor product of L^1(G) and a banach space A is L^1(G, A) (The space of integrable A-valued functions on locally compact group G). I search for a proof of it, but I can not to find.Does anyone have proof of it.

One question about the tensor product of $L^1(G)$ and a Banach space $A$

We know that the tensor product of $L^1(G)$ and a Banach space $A$ is isometric to $L^1(G, A)$, the space of all Bochner-integrable $A$-valued functions on a locally compact group $G$. I am looking for a proof of this fact but I cannot find it. Does anyone have proof of it?

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hosain
hosain
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One question about tensor product of L^1(G) and a banach space A

We know the tensor product of L^1(G) and a banach space A is L^1(G, A) (The space of integrable A-valued functions on locally compact group G). I search for a proof of it, but I can not to find.Does anyone have proof of it.