Similar operator topologies on the space of positive contractions
Abstract
In this article, we study the similarity of the Polish operator topologies WOT, SOT, SOT* and SOT* on the set of the positive contractions on p with p > 1. Using the notion of norming vector for a positive operator, we prove that these topologies are similar on P1(2), that is, they have the same dense sets in P1(2). In particular, these topologies will share the same comeager sets in P1(2). We then apply these results to the study of typical properties of positive contractions on p-spaces in the Baire category sense. In particular, we prove that a typical positive contraction T ∈ (P1(2), SOT) has no eigenvalue. This stands in strong contrast to a result of Eisner and M\'atrai, stating that the point spectrum of a typical contraction T ∈ (B1(2), SOT) contains the whole unit disk. As a consequence of our results, we obtain that a typical positive contraction T ∈ (P1(2), WOT) (resp. T ∈ (P1(2), SOT*)) has no eigenvalue.
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