| [1] |
David W. Catlin and Sanghyun Cho. Extension of CR
structures on three dimensional compact pseudoconvex CR manifolds.
Math. Ann., 334(2):253-280, 2006. |
| [2] |
David Catlin. The Bergman kernel and a theorem of Tian. In
Analysis and geometry in several complex variables (Katata,
1997), Trends Math., pages 1-23. Birkhäuser Boston,
Boston, MA, 1999. |
| [3] |
David W. Catlin and John P. D'Angelo. An isometric
imbedding theorem for holomorphic bundles. Math. Res.
Lett., 6(1):43-60, 1999. |
| [4] |
David W. Catlin and John P. D'Angelo. Positivity
conditions for bihomogeneous polynomials. Math. Res.
Lett., 4(4):555-567, 1997. |
| [5] |
David W. Catlin and John P. D'Angelo. A stabilization
theorem for Hermitian forms and applications to holomorphic
mappings. Math. Res. Lett., 3(2):149-166, 1996. |
| [6] |
Thomas Bloom, David Catlin, John P. D'Angelo, and Yum-Tong
Siu, editors. Modern methods in complex analysis, volume
137 of Annals of Mathematics Studies. Princeton University
Press, Princeton, NJ, 1995. Papers from the conference honoring
Robert C. Gunning and Joseph J. Kohn on the occasion of their
sixtieth birthdays held at Princeton University, Princeton, New
Jersey, March 16-20, 1992. |
| [7] |
David Catlin. Sufficient conditions for the extension of CR
structures. J. Geom. Anal., 4(4):467-538, 1994. |
| [8] |
David Catlin and László Lempert. A note on the
instability of embeddings of Cauchy-Riemann manifolds. J. Geom.
Anal., 2(2):99-104, 1992. |
| [9] |
David Catlin. Extension of CR structures. In Several
complex variables and complex geometry, Part 3 (Santa Cruz, CA,
1989), volume 52 of Proc. Sympos. Pure Math.,
pages 27-34. Amer. Math. Soc., Providence, RI, 1991. |
| [10] |
David W. Catlin. Estimates of invariant metrics on
pseudoconvex domains of dimension two. Math. Z.,
200(3):429-466, 1989. |
| [11] |
S. Bell and D. Catlin. Regularity of CR mappings.
Math. Z., 199(3):357-368, 1988. |
| [12] |
David Catlin. A Newlander-Nirenberg theorem for manifolds with
boundary. Michigan Math. J., 35(2):233-240, 1988. |
| [13] |
David Catlin. Regularity of solutions of the -Neumann problem.
In Proceedings of the International Congress of Mathematicians,
Vol. 1, 2 (Berkeley, Calif., 1986), pages 708-714, Providence,
RI, 1987. Amer. Math. Soc. |
| [14] |
David Catlin. Subelliptic estimates for the -Neumann problem on
pseudoconvex domains. Ann. of Math. (2), 126(1):131-191,
1987. |
| [15] |
David W. Catlin. Invariant metrics on pseudoconvex
domains. In Several complex variables (Hangzhou, 1981),
pages 7-12. Birkhäuser Boston, Boston, MA, 1984. |
| [16] |
David Catlin. Boundary invariants of pseudoconvex domains.
Ann. of Math. (2), 120(3):529-586, 1984. |
| [17] |
David W. Catlin. Global regularity of the -Neumann
problem. In Complex analysis of several variables (Madison,
Wis., 1982), volume 41 of Proc. Sympos. Pure
Math., pages 39-49. Amer. Math. Soc., Providence, RI,
1984. |
| [18] |
E. Bedford, S. Bell, and D. Catlin. Boundary
behavior of proper holomorphic mappings. Michigan Math.
J., 30(1):107-111, 1983. |
| [19] |
David Catlin. Necessary conditions for subellipticity of the
-Neumann problem. Ann. of Math. (2), 117(1):147-171,
1983. |
| [20] |
Steven Bell and David Catlin. Boundary regularity of proper
holomorphic mappings. Duke Math. J., 49(2):385-396,
1982. |
| [21] |
Steven Bell and David Catlin. Proper holomorphic mappings
extend smoothly to the boundary. Bull. Amer. Math. Soc.
(N.S.), 7(1):269-272, 1982. |
| [22] |
David Catlin. Necessary conditions for subellipticity and
hypoellipticity for the -Neumann problem on pseudoconvex domains.
In Recent developments in several complex variables (Proc.
Conf., Princeton Univ., Princeton, N. J., 1979), volume 100 of
Ann. of Math. Stud., pages 93-100. Princeton Univ. Press,
Princeton, N.J., 1981. |
| [23] |
David Catlin. Boundary behavior of holomorphic functions on
pseudoconvex domains. J. Differential Geom., 15(4):605-625
(1981), 1980. |
