Quadratic estimates and functional calculi of perturbed Dirac operators

Abstract: Abstract. We prove quadratic estimates for complex perturbations of Diractype operators, and thereby show that such operators have a bounded functional calculus. As an application we show that spectral projections of the Hodge-Dirac operator on compact manifolds depend analytically on L ∞ changes in the metric. We also recover a unified proof of many results in the Calderón program, including the Kato square root problem and the boundedness of the Cauchy operator on Lipschitz curves and surfaces.

“…Fortunately, there is a weaker notion of Gaussian decay, which holds on any complete Riemannian manifold, namely the notion of L 2 off-diagonal estimates, as introduced by Gaffney [27]. This notion has already proved to be a good substitute of Gaussian estimates for such questions as the Kato square root problem or L p -bounds for Riesz transforms when dealing with elliptic operators (even in the Euclidean setting) for which Gaussian estimates do not hold (see [1,4,9] in the Euclidean setting, and [2] in a complete Riemannian manifold). We show in the present work that a theory of Hardy spaces of differential forms can be developed under such a notion.…”

“…for the commutator of two operators T and S. The proof is done by induction on k and relies on a commutator argument, as in [9], Proposition 5.2. For k = 0, the conclusion is given by Lemma 3.3.…”

Hardy Spaces of Differential Forms on Riemannian Manifolds

“…Fortunately, there is a weaker notion of Gaussian decay, which holds on any complete Riemannian manifold, namely the notion of L 2 off-diagonal estimates, as introduced by Gaffney [27]. This notion has already proved to be a good substitute of Gaussian estimates for such questions as the Kato square root problem or L p -bounds for Riesz transforms when dealing with elliptic operators (even in the Euclidean setting) for which Gaussian estimates do not hold (see [1,4,9] in the Euclidean setting, and [2] in a complete Riemannian manifold). We show in the present work that a theory of Hardy spaces of differential forms can be developed under such a notion.…”

“…for the commutator of two operators T and S. The proof is done by induction on k and relies on a commutator argument, as in [9], Proposition 5.2. For k = 0, the conclusion is given by Lemma 3.3.…”

Hardy Spaces of Differential Forms on Riemannian Manifolds

“…The example that motivated the study of perturbed Dirac operators it the following setup, introduced in [7] and exploited in [8] to reprove the Kato square root theorem obtained in [5] for second order operators and in [6] for systems. Let A ∈ L ∞ (R n ; L(C m ⊗ C n )) satisfy …”

Remarks on Functional Calculus for Perturbed First-order Dirac Operators

“…It remains only to verify that there exists η > 0 such that 14) where E Q := Q\( j Q j ). By (iii ) we have that…”

Boundedness and applications of singular integrals and square functions: a survey