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Let G is a locally compact group. Is thisthe following true?
The tensor product of L^1(G) with L^1(G) is L^(G * G), where * is the product cartésiennes.
The tensor product of $L^1(G)$ with $L^1(G)$ is $L^1(G \times G)$.
Let G is a locally compact group. Is this true?
The tensor product of L^1(G) with L^1(G) is L^(G * G), where * is the product cartésiennes.
Let G is a locally compact group. Is the following true?
The tensor product of $L^1(G)$ with $L^1(G)$ is $L^1(G \times G)$.
