Residual SCI Upper Bounds And Lower Witnesses For Koopman Approximate Point Spectra In Lp For 1<p<∞: Extended Version

Abstract

We study residual computation of approximate point spectral sets of bounded Koopman operators KF on Lp( X,ω), 1<p<∞, where X is a compact metric space and ω is a finite Borel measure. The input is the underlying map F : X X, accessed through point evaluations, and the output metric is the Hausdorff metric on non-empty compact subsets of C. For a bounded operator T, we distinguish the regularized approximate point -pseudospectrum Rap,(T) from the closed approximate point -pseudospectrum Cap,(T). The latter is the direct closed lower-norm analogue of the approximate point -pseudospectrum used in the L2 Koopman SCI theory. Using continuous finite-dimensional dictionaries and tagged quadrature residuals, we prove SCI upper bounds for Rap,(T), Cap,(T), and σap on four natural classes of maps: continuous nonsingular maps, maps with a prescribed modulus of continuity, measure-preserving maps, and maps satisfying both measure preservation and a prescribed modulus.