6533b835fe1ef96bd129f63b

RESEARCH PRODUCT

Form-perturbation theory for higher-order elliptic operators and systems by singular potentials

Mustapha Mokhtar-kharroubi

subject

Elliptic operatorPure mathematicsCompact spaceElliptic systemsSemigroupGeneral MathematicsSingular matrixScalar (mathematics)General EngineeringGeneral Physics and AstronomyHölder conditionMathematics

description

We give a form-perturbation theory by singular potentials for scalar elliptic operators onL2(Rd)of order 2mwith Hölder continuous coefficients. The form-bounds are obtained from anL1functional analytic approach which takes advantage of both the existence ofm-gaussian kernel estimates and the holomorphy of the semigroup inL1(Rd).We also explore the (local) Kato class potentials in terms of (local) weak compactness properties. Finally, we extend the results to elliptic systems and singular matrix potentials.This article is part of the theme issue ‘Semigroup applications everywhere’.

yearjournalcountryeditionlanguage
2020-10-19Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences
https://doi.org/10.1098/rsta.2019.0621