Suppose $P_{1}$ is a $\frac{n}{2}$-dimension polytope in $ R^{n}$ with barycenter $c$, and $P_{2}$ is a $(n-1)$-simplex in $R^{n}$ with the same barycenter as $P_{1}$, i.e $c$ . And also suppose they do not contain each other and both lie in the hyperpalne $x_{1}+...+x_{n} =d$
I know these two polytope intersect each other because they have the same barycenter.
but Since my intuition for high dimensional geometry is not always right is this statement true that their facets intersect each other?
