References
Bedford, E., Gaveau, B.: Envelopes of holomorphy of certain 2-spheres in ℂ2. preprint
Bishop, E.: Differentiable manifolds in complex Euclidean space. Duke Math. Jour.32, 1–22 (1965)
Hill, C.D., Taiani, G.: Families of analytic discs in ℂ2 with boundaries on a prescribedCR submanifold. Annali Scoula Norm. Sup. Pisa5, 327–380 (1978)
Hunt, L.R.: The local envelope of holomorphy of ann-manifold in ℂ2. Boll. Un. Mat. Ital.4, 12–35 (1971)
Hunt, L.R., Wells, R.O., Jr.: The envelope of holomorphy of a two-manifold in ℂ2x. Proc. Conf. on Complex. Anal. Rice Univ. 1969. Rice Univ. Studies56, 51–62 (1970)
Kellog, O.D.: Foundations of potential theory. New York: Dover 1953
Nirenberg, L., Webster, S., Yang, P.: Local boundary regularity of holomorphic mappings. Comm. Pure Appl. Math.33, 305–338 (1980)
Author information
Authors and Affiliations
Additional information
Partially supported by NSF, Grant No. MCS 8101691
Alfred P. Sloan Fellow. Partially supported by NSF, Grant No. MCS 8100793
Rights and permissions
About this article
Cite this article
Kenig, C.E., Webster, S.M. The local hull of holomorphy of a surface in the space of two complex variables. Invent Math 67, 1–21 (1982). https://doi.org/10.1007/BF01393370
Issue Date:
DOI: https://doi.org/10.1007/BF01393370