Minimal Face
# Definition
Let $V$ be an Inner Product Space over $\mathbb{R}$ and let $P \subset V$ be a Convex Polytope. A Minimal Face of $P$ is a face of $P$ that does not contain any other Proper Face of $P$.
Search
Let $V$ be an Inner Product Space over $\mathbb{R}$ and let $P \subset V$ be a Convex Polytope. A Minimal Face of $P$ is a face of $P$ that does not contain any other Proper Face of $P$.