References
Cima, J.A., Suffridge, T.J.: A reflection principle with applications to proper holomorphic mappings. Math. Ann. 265, 489–500 (1983)
Cole, B., Range, R.M.: A-measures on complex manifolds and some applications. J. Funct. Anal.11, 393–400 (1972)
Diederich, K., Fornaess, J.E.: Proper holomorphic images of strictly pseudoconvex domains. Math. Ann.259, 279–286 (1982)
Faran, J.J.: Maps from the two-ball to the three-ball and maps taking lines to plane curves. Preprint
Fornaess, J.E.: Embedding strictly pseudoconvex domains in convex domains. Am. J. Math.98, 529–569 (1976)
Hakim, M., Sibony, N.: Fonctions holomorphes bornees sur la boule unite deC n. Invent. Math.67, 213–222 (1982)
Lempert, L.: Imbedding strictly pseudoconvex domains into a ball. Am. J. Math.104, 901–904 (1982)
Løw, E.: A construction of inner functions on the unit ball inC p. Invent. Math.67, 223–229 (1982)
Løw, E.: Inner functions and boundary values inH ∞ (Ω) andA (Ω) in smoothly bounded pseudoconvex domains. Math. Zeitschr.185, 191–210 (1984)
Løw, E.: The ball inC n is a closed complex submanifold of a polydisc. Preprint
Rudin, W.: Function theory in the unit ball ofC n. Berlin-Heidelberg-New York: Springer 1980
Webster, S.M.: On mapping ann-ball into an (n+1)-ball in complex space. Pac. J. Math.81, 267–272 (1979)
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Løw, E. Embeddings and proper holomorphic maps of strictly pseudoconvex domains into polydiscs and balls. Math Z 190, 401–410 (1985). https://doi.org/10.1007/BF01215140
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DOI: https://doi.org/10.1007/BF01215140