Spectral regularity with respect to dilations for a class of pseudodifferential operators
Abstract
We continue the study of the perturbation problem discussed in CP3 and get rid of the 'slow variation' assumption by considering symbols of the form a(x+δ\,F(x),) with a a real H\"ormander symbol of class S00,0(Rd×Rd) and F a smooth function with all its derivatives globally bounded, with |δ|≤1. We prove that while the Hausdorff distance between the spectra of the Weyl quantization of the above symbols in a neighbourhood of δ=0 is still of the order |δ|, the distance between their spectral edges behaves like |δ| with ∈[1/2,1) depending on the rate of decay of the second derivatives of F at infinity.
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