This is a preview of subscription content, log in via an institution to check access.
References
Christ, M.,Lectures on Singular Integral Operators. CBMS Regional Conf. Ser. in Math., 77, Amer. Math. Soc., Providence, RI, 1990.
—, AT(b) theorem with remarks on analytic capacity and the Cauchy integral.Colloq. Math., 60/61 (1990), 601–628.
Coifman, R. R., Jones, P. W. &Semmes, S., Two elementary proofs of theL 2 boundedness of Cauchy integrals on Lipschitz curves.J. Amer. Math. Soc., 2 (1989), 553–564.
Coifman, R. R. &Weiss, G.,Analyse harmonique non-commutative sur certains espaces homogènes. Lecture Notes in Math., 242. Springer-Verlag, Berlin-Heidelberg, 1971.
David, G., Opérateurs intégraux singuliers sur certaines courbes du plan complexe.Ann. Sci. École Norm. Sup. (4), 17 (1984), 157–189.
—,Wavelets and Singular Integrals on Curves and Surfaces. Lecture Notes in Math., 1465. Springer-Verlag, Berlin-Heidelberg, 1991.
—, Unrectifiable 1-sets have vanishing analytic capacity.Rev. Mat. Iberoamericana, 14 (1998), 369–479.
—, Analytic capacity, Calderón-Zygmund operators, and rectifiability.Publ. Mat., 43 (1999), 3–25.
David, G. &Journé, J.-L., A boundedness criterion for generalized Calderón-Zygmund operators.Ann. of Math. (2), 120 (1984), 371–397.
David, G., Journé, J.-L. &Semmes, S., Operateurs de Calderón-Zygmund fonctions para-accrétives et interpolation.Rev. Mat. Iberoamericana, 1 (1985), 1–56.
David, G. &Mattila, P., Removable sets for Lipschitz harmonic functions in the plane.Rev. Mat. Iberoamericana, 16 (2000), 137–215.
Davie, A. M. &Øksendal, B., Analytic capacity and differentiability properties of finely harmonic functions.Acta Math., 149 (1982), 127–152.
Garnett, J. B. &Jones, P. W., BMO from dyadic BMO.Pacific J. Math., 99 (1982), 351–371.
Mattila, P., Removability, geometric measure theory, and singular integrals, inPotential Theory—ICPT 94 (Kouty, 1994), pp. 129–146. de Gruyter, Berlin, 1996.
Mattila, P., Melnikov, M. S. &Verdera, J., The Cauchy integral, analytic capacity, and uniform rectifiability.Ann. of Math. (2), 144 (1996), 127–136.
Mattila, P. &Paramonov, P. V., On geometric properties of harmonic Lip1-capacity.Pacific J. Math., 171 (1995), 469–491.
Melnikov, M. S., Analytic capacity: a discrete approach and the curvature of measure.Mat. Sb., 186 (1995), 57–76 (Russian), English translation inSb. Math., 186 (1995), 827–846.
Melnikov, M. S. & Verdera, J., A geometric proof of theL 2 boundedness of the Cauchy integral on Lipschitz graphs.Internat. Math. Res. Notices, 1995, 325–331.
Murai, T.,A Real Variable Method for the Cauchy Transform, and Analytic Capacity. Lecture Notes in Math., 1307. Springer-Verlag, Berlin-Heidelberg, 1988.
Nazarov, F. &Treil, S., The hunt for a Bellman function: applications to estimates for singular integral operators and to other classical problems of harmonic analysis.Algebra i Analiz, 8 (1996), 32–162; English translation inSt. Petersburg Math. J., 8 (1997), 721–824.
Nazarov, F., Treil, S. & Volberg, A., Cauchy integral and Calderón-Zygmund operators on nonhomogeneous spaces.Internat. Math. Res. Notices, 1997, 703–726.
Nazarov, F., Treil, S. & Volberg, A., Weak type estimates and Cotlar inequalities for Calderón-Zygmund operators on nonhomogeneous spaces.Internat. Math. Res. Notices, 1998, 463–487.
—, Accretive systemTb-theorems on non-homogeneous spaces.Duke Math. J., 113 (2002), 259–312.
Sawyer, E. T., A characterization of a two-weight norm inequality for maximal operators.Studia Math., 75 (1982), 1–11.
Tolsa, X., Cotlar's inequality without the doubling condition and existence of principal values for the Cauchy integral of measures.J. Reine Angew. Math., 502 (1998), 199–235.
—,L 2-boundedness of the Cauchy integral operator for continuous measures.Duke Math. J., 98 (1999), 269–304.
—, BMO,H 1 and Calderón-Zygmund operators for non-doubling measures.Math. Ann., 319 (2001), 89–149.
—, Littlewood-Paley theory and theT(1) theorem with non-doubling measures.Adv. Math., 164 (2001), 57–116.
Treil, S. &Volberg, A., Wavelets and the angle between past and future.J. Funct. Anal., 143 (1997), 269–308.
Uy, N. X., Removable sets of analytic functions satisfying a Lipschitz condition.Ark. Mat., 17 (1979), 19–27.
—, A removable set for Lipschitz harmonic functions.Michigan Math. J., 37 (1990), 45–51.
Verdera, J., On theT(1)-theorem for the Cauchy integral.Ark. Mat., 38 (2000), 183–199.
Author information
Authors and Affiliations
Additional information
All authors are partially supported by the NSF Grant DMS 9970395.
Rights and permissions
About this article
Cite this article
Nazarov, F., Treil, S. & Volberg, A. TheTb-theorem on non-homogeneous spaces. Acta Math. 190, 151–239 (2003). https://doi.org/10.1007/BF02392690
Received:
Revised:
Issue Date:
DOI: https://doi.org/10.1007/BF02392690