A Note on the Independence Number of an Identically Self-dual Perfect Matroid Design


Danut Marcu


Let $E$ be a finite set and $M(E,r)$ an identically self-dual perfect matroid design on $E$, with hyperplane cardinality $c(M)$, and $r$ as a rank function. If $M$ is not the $r(E)$-uniform matroid, we show that its independence number equals $c(M)-1$.