A note on the Huijsmans-de Pagter problem on finite dimensional ordered vector spaces
Abstract
A classical problem posed in 1992 by Huijsmans and de Pagter asks whether, for every positive operator T on a Banach lattice with spectrum σ(T) = \1\, the inequality T id holds true. While the problem remains unsolved in its entirety, a positive solution is known in finite dimensions. In the broader context of ordered Banach spaces, Drnovsek provided an infinite-dimensional counterexample. In this note, we demonstrate the existence of finite-dimensional counterexamples, specifically on the ice cream cone and on a polyhedral cone in R3. On the other hand, taking inspiration from the notion of m-isometries, we establish that each counterexample must contain a Jordan block of size at least 3.
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