[1] S. Bell: A duality theorem for harmonic functions, Michigan Math. J. 29 (1982), 123–128.
[2] D. Bekolle:´ In´egalits Lp pour les projecteurs de Bergman de certains domaines de C2, C. R. Acad. Sci. Paris Sr. I Math. 29 (1982), 395–397.
[3] P. Charpentier and Y. Dupain: Estimates for the Bergman and Szeg ¨o projections for pseudoconvex domains of finite type with locally diagonalizable Levi form, Publ. Mat. 50 (2006), 413–446.
[4] S.C. Chen and M.C. Shaw: Partial Differential Equations in Several Complex Variables, AMS/IP, Studies in Advanced Mathematics, American Mathematical Society, Providence, RI, 2001.
[5] J.E. Fornaess, L. Lee and Y. Zhang: On supnorm estimates for ∂¯ on infinite type convex domains in C2, J. Geom. Anal. 21 (2011), 495–512.
[6] G.B. Folland: Real Analysis: Modern Techniques and Their Applications, 2nd ed., Pure and Applied Mathematics, John Wiley and Sons Inc., New York, 1999.
[7] L.K. Ha: Tangential Cauchy-Riemann equations on pseudoconvex boundaries of finite and infinite type in C2, Results Math. 72 (2017), 105–124.
[8] L.K. Ha: On the global Lipschitz continuity of the Bergman projection on a class of convex domains of infinite type in C2, Colloq. Math. 150 (2017), 187–205.
[9] L.K. Ha: Lp-approximation of holomorphic functions in Lp-norm on a class of convex domains, Bull. Aust. Math. Soc. 97 (2018), 446–452.
[10] L.K. Ha: H ¨older and Lp Estimates for the ∂¯ equation in a class of convex domains of infinite type in Cn, Monatsh. Math. 190 (2019), 517–540.
[11] L.K. Ha, T.V. Khanh and A. Raich: Lp estimates for the ∂¯-equation on a class of infinite type domains, Internat J. Math. 25 (2014), 1450106, 15pp.
[12] L. Hormander: ¨ L2 estimates and existence theorems for the ∂¯-operator, Acta Math. 113 (1965), 89–152.
[13] L.K. Ha and L.H. Khoi: On boundedness and compactness of composition operators between Bergman spaces on infinite type convex domains in C2, preprint (2020).
[14] N. Kerzman: H ¨oder and Lp estimates for solutions of ∂¯ = f in strongly pseudoconvex domains, Comm. Pure Appl. Math. 24 (1971), 1171–1183.
[15] N. Kerzman and E. Stein: The Szeg ¨o kernel in terms of Cauchy-Fattapi`e kernels, Duke Math. J. 45 (1978), 197–224.
[16] T.V. Khanh: Supnorm and f -H¨older estimates for ∂¯ on convex domains of general type in C2, J. Math. Anal. Appl. 403 (2013), 522–531.
[17] S.G. Krantz: Function theory of several complex variables, AMS Chelsea publishing, Providence, RI, 2000.
[18] L. Lanzani and E.M. Stein: Cauchy-type integrals in several complex variables, Bull. Math. Sci. 3 (2013), 241–285.
[19] E. Ligocka: The H ¨older continuity of the Bergman projection and proper holomorphic mappings, Studia Math. 80 (1984), 89–107.
[20] E. Ligocka: The Sobolev spaces of harmonic functions, Studia Math. 84 (1986), 79–87.
[21] E. Ligocka: The Bergman projection on harmonic functions, Studia Math. 85 (1987), 229–246.
[22] J.D. McNeal: Convex domains of finite type, J. Funct. Anal. 108 (1992), 361–373.
[23] J.D. McNeal and E.M. Stein: Mapping properties of the Bergman projection on convex domains of finite type, Duke Math. J. 73 (1994), 177–199.
[24] A. Nagel, E.M. Stein and S. Wainger: Balls and metrics defined by vector fields. I. Basic properties, Acta Math. 155 (1985), 103–147.
[25] D.H. Phong and E.M. Stein: Estimates for the Bergman and Szeg ¨o projections on strongly pseudo-convex domains, Duke Math. J. 44 (1977), 695–704.
[26] R.M. Range: H ¨older estimates for ∂¯ on convex domains in C2 with real analytic boundary; in Several complex variables Proc. of Symposia in Pure Math. 30, Amer. Math. Soc., Providence, R.I., 1977, 31–33.
[27] R.M. Range: The Carath´eodory metric and holomorphic maps on a class of weakly pseudoconvex domains, Pacific J. Math. 78 (1978), 173–189.
[28] R.M. Range: On H ¨older estimates for ∂¯bu = f on weakly pseudoconvex domains; in Several complex variables, Proc. Inter. Conf. Cortona, Italy 1976–1977. Scoula. Norm. Sup. Pisa 1978, 247–267.
[29] R.M. Range: Holomorphic Functions and Integral Representation in Several Complex Variables, SpringerVerlag, Berlin, 1986.
[30] W. Rudin: Function Theory in the Unit Ball of Cn, Springer-Verlag, Berlin, 1980.
[31] M.C. Shaw: H ¨older and Lp estimates for ∂¯b on weakly pseudoconvex boundaries in C2, Math. Ann. 279 (1988), 635–652.
[32] J. Verdera: L∞-continuity of Henkin operators solving ∂¯ in certain weakly pseudoconvex domains of C2, Proc. Roy. Soc. Edinburg, 99 (1984), 25–33.