Let $(E, || \cdot||)$ be a Banach lattice. Let $E_{+}$ denote the positive cone of $E$. The metric $\rho$ on $E_{+}$ is induced by the complete lattice norm $|| \cdot ||$, which is defined by $\rho(x,y) := || x - y||$ for all $x,y \in E_{+}$.
My question is that whether the metric space $(E_{+}, \rho)$ is complete?
I think it is complete. Because we know that a closed subset of Banach space is complete, and the positive cone of a Banach lattice is closed, so that $(E_{+}, \rho)$ is complete.
But I read a textbook wrote a thing that "The metric induced by a complete lattice norm need not be complete". So I am confused now and would like to seek for your help. Thanks in advance!
