References
- Chern SS, Moser J. Real hypersurfaces in complex manifolds. Acta Math. 1974;133:219–271.
- Phong DH, Stein EM. Hilbert integrals, singular integrals and Radon transforms I. Acta Math. 1986;157:99–157.
- Phong DH, Stein EM. Hilbert integrals, singular integrals and Radon transforms II. Invent Math. 1986;86:75–113.
- Folland GB, Kohn JJ. The Neumann problem for the Cauchy-Riemann complex. Princeton, NJ: Princeton University Press; 1972. (Annals of Mathematics Studies Series; 75).
- Chow W-L. Uber systeme von linearen partiellen differentialgleichungen erster ordnung. Math Ann. 1939;117:98–105.
- Nagel A, Stein EM, Wainger S. Balls and metrics defined by vector fields I: basic properties. Acta F Math. 1985;137:103–147.
- Coifman RR, Weiss G. Analyse harmonique non-commutative and certains espaces homogǹes. Berlin: Springer; 1971. (Lecture Notes in Math.; 242).
- Coifman R, Weiss G. Extensions of Hardy spaces and their use in analysis. Bull Amer Math Soc. 1977;83:569–645.
- Fefferman C, Phong DH. Subelliptic eigenvalue problems. Proceedings conference harmonic analysis, Wadsworth Math. Series. 1981. Belmont, CA: Wadsworth; 1983. p. 590–606.
- Hörmander L. Hypoelliptic second-order differential equations. Acta Math. 1967;119:147–171.
- Korányi A, Vagi S. Singular integrals in homogeneous spaces and some problems of classical analysis. Ann Scuola Norm Sup Pisa. 1971;25:575–848.
- Folland GB. A fundamental solution for a subelliptic operator. Bull Amer Math Soc. 1973;79:373–376.
- Folland GB, Stein EM. Estimates for the ∂¯b complex and analysis on the Heisenberg group. Comm Pure Appl Math. 1974;27:429–522.
- Greiner P. A fundamental solution for a non-ellpitic partial differential operator. Can J Math. 1979;31:1107–1120.
- Beals R, Greiner PC. Calculus on Heisenberg Manifolds. Princeton, NJ: Princeton University Press; 1988.
- Beals R, Gaveau B, Greiner PC. The Green function of model two step hypoelliptic operators and the analysis of certain tangential Cauchy-Riemann complexes. Adv Math. 1996;121:288–345.
- Beals R, Gaveau B, Greiner PC. Complex Hamiltonian mechanics and parametrices for subelliptic laplacians, I, II, III. Bull Sci Math. 1997;21:195–259.
- Beals R, Gaveau B, Greiner PC. On a geometric formula for the fundamental solution of subelliptic laplacians. Math Nachr. 1996;181:81–163.
- Beals R, Gaveau B, Greiner PC. Uniform hypoelliptic Green's functions. J Math Pures Appl. 1998;77:209–248.
- Greiner P, Li YT. A fundamental solution for a nonelliptic partial differential operator (II). Anal Appl. 2018;16(3):407–433.
- Stein EM. Harmonic analysis: real-variable methods, orthogonality, and oscillatory integrals. Princeton, NJ: Princeton University Press; 1993. (Princeton Math Series; 43).
- Berenstein C, Chang D-C, Tie J. Laguerre calculus and its applications in the heisenberg group. Cambridge, Massachusetts: International Press; 2001. (AMS/IP Series in Advanced Mathematics; 22).
- Calin O, Chang D-C, Greiner P. Geometric analysis on the Heisenberg group and its generalizations. Providence RI, Somerville, MA: American Mathematical Society, International Press; 2007. (AMS/IP Studies in Advanced Mathematics; 40).
- Chang D-C, Tie J. The sub-Laplacian operators of some model domains. Berlin/Boston: Walter de Gruyter GmbH; 2022.
- Gaveau B. Principe de moindre action, propagation de la chaleur et estimates solution elliptiques sur certains groupes nilpotents. Acta Math. 1977;139:95–153.
- Greiner P, Stein EM. Estimates for the
-Neumann problem. Princeton, NJ: Princeton University Press; 1977. (Mathematical Notes; 19).
- Greiner P, Stein EM. On the solvability of some differential operators of type □b. Proceedings of International Conference, Cortona 1976–1977, Ann. Scuola Norm. Sup. Pisa Cl. Sci. Vol. 4. Pisa: Scuola Norm. Sup. Pisa; 1978. p. 106–165.
- Greiner P, Kohn JJ, Stein EM. Necessary and sufficient conditions for solvability of the Lewy equation. Proc Nat Acad Sci USA. 1975;72:3287–3289.
- Erdélyi A, Magnus W, Oberhettinger F, et al. Tables of integral transforms. Vol. 1. New York: Bateman Manuscript project, McGraw-Hill; 1955.
- Chang D-C, Duong XT, Li J, et al. An explicit expression of Cauchy-Szegö kernel for quaternion Siegel upper half space and applications. Indiana University Math J. 2021;70(6):2451–2477.
- Deng DG, Han YS. Harmonic analysis on spaces of homogeneous type. Berlin: Springer-Verlag; 2009. (Lecture Notes in Mathematics; 1966).
- Han Y, Müller D, Yang D. A theory of Besov and Triebel-Lizorkin spaces on metric measure spaces modeled on Carnot-Carathéodory spaces. Abstract Appl Anal. 2008;2008:893409.
- Christ M. A T(b) theorem with remarks on analytic capacity and the Cauchy integral. Colloq Math. 1990;60-61:601–628.
- Nagel A, Stein EM. The ◻b-heat equation on pseudoconvex manifolds of finite type in C2. Math Z. 2001;238(1):37–88.
- Chang D-C, Han Y, Wu X. Hardy spaces associated to the kohn laplacian on a family of model domains in
- Grafakos L. Modern fourier analysis. 3rd ed. New York: Springer; 2014. (Graduate Texts in Mathematics; 250).
- Han Y, Müller D, Yang D. Littlewood-Paley-Stein characterizations for Hardy spaces on spaces of homogeneous type. Math Nachr. 2006;279:1505–1537.
- Frazier M, Jawerth B. A discrete transform and decomposition of distribution spaces. J Funct Anal. 1990;93:34–170.
- Chang D-C, Nagel A, Stein EM. Estimates for the ∂¯-Neumann problem in pseudoconvex domains of finite type in C2. Acta Math. 1992;169:153–228.
- Nagel A, Rosay JP, Stein EM, et al. Estimates for the Bergman and Szegö kernels in C2. Ann Math. 1989;129:113–149.
- David G, Journé JL, Semmes S. Opérateurs de Calderón-Zygmund, fonctions para-accrétives et interpolation. Rev Mat Iberoam. 1985;1:1–56.