Número:
14
Ano:
2000
Autor:
João Ribeiro Gonçalves Filho
Luiz A. B. San Martin
Abstract:
Let $W\subset \Bbb{R}^{n}$ be a pointed and generating cone and denote by $S(W)$ the semigroup of matrices with positive determinant leaving $W$ invariant. The purpose of this paper is to prove that $S(W)$ is path connected. This result has the following consequence: Semigroups with nonempty interior in the group $\mathrm{Sl}( n,\Bbb{R}) $ are classified into types, each type being labelled by a flag manifold. The semigroups whose type is given by the projective space $\Bbb{P}^{n-1}$ form one of the classes. It is proved here that the semigroups in $\mathrm{Sl}(n,\Bbb{R})$ leaving invariant a pointed and generating cone are the only maximal connected in the class of $\Bbb{P}^{n-1}$.
Keywords:
Semigroups
convex cones
positive matrices
maximal connected semigroups
Mathematics Subject Classification 2000 (MSC 2000):
20M20; 11C20
Arquivo: