Triangularizability of trace-class operators with increasing spectrum

Abstract

For any measurable set E of a measure space (X, μ), let PE be the (orthogonal) projection on the Hilbert space L2(X, μ) with the range ran \, PE = \f ∈ L2(X, μ) : f = 0 \ \ a.e. \ on \ Ec\ that is called a standard subspace of L2(X, μ). Let T be an operator on L2(X, μ) having increasing spectrum relative to standard compressions, that is, for any measurable sets E and F with E ⊂eq F, the spectrum of the operator PE T|ran \, PE is contained in the spectrum of the operator PF T|ran \, PF. In 2009, Marcoux, Mastnak and Radjavi asked whether the operator T has a non-trivial invariant standard subspace. They answered this question affirmatively when either the measure space (X, μ) is discrete or the operator T has finite rank. We study this problem in the case of trace-class kernel operators. We also slightly strengthen the above-mentioned result for finite-rank operators.