Typical properties of positive contractions and the invariant subspace problem

Abstract

In this paper, we first study some elementary properties of a typical positive contraction on q for the Strong Operator Topology and the Strong* Operator Topology. Using these properties, we prove that a typical positive contraction on 1 (resp. on 2) has a non-trivial invariant subspace for the Strong Operator Topology (resp. for the Strong Operator Topology and the Strong* Operator Topology). We then focus on the case where X is a Banach space with a basis. We prove that a typical positive contraction on a Banach space with an unconditional basis has no non-trivial closed invariant ideals for the Strong Operator Topology and the Strong* Operator Topology. In particular, this shows that when X = q with 1 ≤ q < ∞, a typical positive contraction T on X for the Strong Operator Topology (resp. for the Strong* Operator Topology when 1 < q < ∞) does not satisfy the Abramovich, Aliprantis and Burkinshaw criterion, that is, there is no non-zero positive operator in the commutant of T which is quasinilpotent at a non-zero positive vector of X. Finally, we prove that, for the Strong* Operator Topology, a typical positive contraction on a reflexive Banach space with a monotone basis does not satisfy the Abramovich, Aliprantis and Burkinshaw criterion.