Kato square root problem with unbounded leading coefficients
Abstract
We prove the Kato conjecture for elliptic operators, L=-∇·(( A+ D)∇\ ), with A a complex measurable bounded coercive matrix and D a measurable real-valued skew-symmetric matrix in Rn with entries in BMO(Rn);\, i.e., the domain of L\, is the Sobolev space H1(Rn) in any dimension, with the estimate \|L\, f\|2 \| ∇ f\|2.
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