Reflection Groups, Generalized Schur Functions, and the Geometry of Majorization
Reflection Groups, Generalized Schur Functions, and the Geometry of Majorization
Let $G$ be a closed subgroup of the orthogonal group $O(n)$ acting on $R^n$. A real-valued function $f$ on $R^n$ is called $G$-monotone (decreasing) if $f(y) \geqq f(x)$ whenever $y \precsim x$, i.e., whenever $y \in C(x)$, where $C(x)$ is the convex hull of the $G$-orbit of $x$. When $G$ …