Logarithmically convex set

A Reinhardt domain D is called logarithmically convex if the image of the set D^* = \{z=(z_1, \cdots, z_n) \in D / z_1 \cdots z_n \neq 0\} under the mapping \lambda : z \rightarrow \lambda(z) = (\ln(|z_1|), \cdots, \ln(|z_n|)) is a convex set in the real space \mathbb{R}^n.

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