SUMMER SCHOOL
Weighted estimates for singular integrals

  1. A characterization of two-weight norm inequality for maximal operator
    by E. T. Sawyer
    Studia Math. 75 (1982), 1--11.

    [presenter: Di Plinio]

  2. Sharp A2 inequality for Haar Shift operators
    by Michael T. Lacey, Stefanie Petermichl, Maria Carmen Reguera
    arXiv:0906.1941
    (14 pages)

    [presenter: Oliveira]

  3. Astala's Conjecture on Distortion of Hausdorff Measures under Quasiconformal Maps in the Plane
    by M. T. Lacey, E.T. Sawyer, I. Uriarte-Tuero
    arXiv:0805.4711.
    (17 pages)

    [presenter: Beznozova]

  4. The Bellman functions and two-weight inequalities for Haar multipliers
    F.Nazarov, S.Treil, A.Volberg
    J. of Amer. Math. Soc., 12 (1999), 909-928.

    [presenter: Boros]

  5. Two weight estimate for the individual Haar multipliers and other well localized operators.} Math. Reserach Letters
    by F.Nazarov, S.Treil, A.Volberg
    Math. Research Letters 15, (2008) no.3, 583--597

    [presenter: Vagharshakyan]

  6. Bellman function, two weighted Hilbert transforms and embeddings of the model spaces $K_\theta$, Dedicated to the memory of Thomas H. Wolff.
    by F. Nazarov and A. Volberg
    J. Anal. Math. 87 (2002), 385--414.

    [presenter: Reznikov]

  7. Heating the Beurling operator: weakly quasiregular maps on the plane are quasiregular
    by S. Petermichel, A. Volberg
    Duke Math. J., 112 (2002), no.2, pp. 281--305.

    [presenter: Pattakos]

  8. A1 bounds for Calderón-Zygmund operators related to a problem of Muckenhoupt and Wheeden
    by A. Lerner, S. Ombrosi, C. Perez
    Int. Math. Res. Not. IMRN 2008, no. 6, (11 pages)

    [presenter: Silva]

  9. Multiparameter operators and sharp weighted inequalities
    by R. Fefferman, J. Pipher
    Amer. J. Math. 119(1997), 337--369

    [presenter: Wang]

  10. The sharp bounds of the Hilbert transform on weighted Lebesgue spaces in terms of classical $A_p$ characteristic
    by S. Petermichl
    Amer. J. Math., 129 (2007), 355--375

    [presenter: Chung]

  11. A sharp estimate on the norm of the martingale transform.
    by J. Wittwer
    Math. Res. Lett. 7 (2000), no. 1, 1--12.

    [presenter: Moraes]

  12. Two weight inequalities for discrete positive operators
    by M. Lacey, E. Sawyer, I. Uriarte-Tuero
    arXiv:0911.3437
    (20 pages)

    [presenter: Tryniecki]

  13. A characterization of the two weight norm inequality for the Hilbert transform.
    by M. Lacey, E. Sawyer, I. Uriarte-Tuero
    arXiv:1001.4043
    (41 pages)

    [presenter: Moen]

  14. Two weight estimate for the Hilbert transform and corona decomposition for non-doubling measures.
    by F. Nazarov, S. Treil, A. Volberg
    part1
    part2
    part3
    part4


    [presenter: Reguera]

  15. Weighted norm inequalities for Calderón-Zygmund operators without doubling conditions.
    X. Tolsa
    Publicacions Matemàtiques. Volume 51, Number 2 (2007), 397-456. search for Tolsa here
    (20 pages)

    [presenter: Azzam]