The Kato Square Root Problem for Divergence Form Operators with Potential

Abstract

The Kato square root problem for divergence form elliptic operators with potential V : Rn → C is the equivalence statement (L + V)12 u2 ∇ u 2 + V12 u 2, where L + V := - div A ∇ + V and the perturbation A is an L∞ complex matrix-valued function satisfying an accretivity condition. This relation is proved for any potential with range contained in some positive sector and satisfying |V|α2 u2 + (-)α2 2 ( |V| - )α2u 2 for all u ∈ D(|V| -) and some α ∈ (1,2]. The class of potentials that will satisfy such a condition is known to contain the reverse H\"older class RH2 and Ln2(Rn) in dimension n > 4. To prove the Kato estimate with potential, a non-homogeneous version of the framework introduced by A. Axelsson, S. Keith and A. McIntosh for proving quadratic estimates is developed. In addition to applying this non-homogeneous framework to the scalar Kato problem with zero-order potential, it will also be applied to the Kato problem for systems of equations with zero-order potential.