Difference between revisions of "Biholomorphic mapping"
From Encyclopedia of Mathematics
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''holomorphic isomorphism, holomorphism, pseudo-conformal mapping'' | ''holomorphic isomorphism, holomorphism, pseudo-conformal mapping'' | ||
| − | A generalization of the concept of a univalent [[Conformal mapping|conformal mapping]] to the case of several complex variables. A [[Holomorphic mapping|holomorphic mapping]] of a domain | + | A generalization of the concept of a univalent [[Conformal mapping|conformal mapping]] to the case of several complex variables. A [[Holomorphic mapping|holomorphic mapping]] of a domain $D\subset\mathbf C^n$ onto a domain $D'\subset\mathbf C^n$ is said to be a biholomorphic mapping if it is one-to-one. A biholomorphic mapping is non-degenerate in $D$; its inverse mapping is also a biholomorphic mapping. |
| − | A [[Domain of holomorphy|domain of holomorphy]] is mapped into a domain of holomorphy under a biholomorphic mapping; holomorphic, pluriharmonic and plurisubharmonic functions are also invariant under a biholomorphic mapping. If | + | A [[Domain of holomorphy|domain of holomorphy]] is mapped into a domain of holomorphy under a biholomorphic mapping; holomorphic, pluriharmonic and plurisubharmonic functions are also invariant under a biholomorphic mapping. If $n>1$, biholomorphic mappings are not conformal (except for a number of linear mappings) and the [[Riemann theorem|Riemann theorem]] is invalid for biholomorphic mappings (e.g. a ball and a polydisc in $\mathbf C^2$ cannot be biholomorphically mapped onto each other). A biholomorphic mapping of a domain $D$ onto itself is said to be a (holomorphic) automorphism; if $n>1$, there exist simply-connected domains without automorphisms other than the identity mapping. |
====References==== | ====References==== | ||
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====Comments==== | ====Comments==== | ||
| − | Concerning boundary behaviour of biholomorphic mappings the following results have been obtained. C. Fefferman's theorem: A biholomorphic mapping between strongly pseudo-convex domains with | + | Concerning boundary behaviour of biholomorphic mappings the following results have been obtained. C. Fefferman's theorem: A biholomorphic mapping between strongly pseudo-convex domains with $C^\infty$-smooth boundary extends $C^\infty$-smoothly to a diffeomorphism between the closures of the domains, see [[#References|[a3]]]. The same result holds if the domains are only pseudo-convex and one of them satisfies condition $R$ for the Bergman projection, see [[#References|[a2]]]. For strongly pseudo-convex domains with $C^k$-boundary, $k>2$, $C^{k-1-\epsilon}$ extendability was obtained ($\epsilon>0$ if $k=2,3,\dots,$ $\epsilon=0$ otherwise) by L. Lempert and by S. Pinčuk. For (weakly) pseudo-convex domains with real-analytic boundary one has even holomorphic extension to a neighbourhood of the closure, see [[#References|[a1]]]. Similar results were obtained for proper holomorphic mappings. |
| − | A biholomorphic mapping | + | A biholomorphic mapping $f$ is proper (i.e. the pre-image of a compact set is compact), since $f^{-1}$ is continuous. Riemann's theorem does not hold in the following sense: There is no proper holomorphic mapping from the polydisc in $\mathbf C^n$ onto the ball in $\mathbf C^m$ for any $n,m>1$, cf. [[#References|[a4]]]. Thus, function theory in $\mathbf C^n$, $n\geq1$, is strongly related to the domain of definition of the functions. For function theory in the (unit) ball of $\mathbf C^n$ see [[#References|[a5]]]; for function theory in polydiscs see [[#References|[a6]]]. For entire holomorphic mappings and their value distribution see [[#References|[a7]]]. |
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> M.S. Baouendi, H. Jacobowitz, F. Trèves, "On the analyticity of CR mappings" ''Ann. of Math.'' , '''122''' (1985) pp. 365–400</TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> St. Bell, "Biholomorphic mappings and the | + | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> M.S. Baouendi, H. Jacobowitz, F. Trèves, "On the analyticity of CR mappings" ''Ann. of Math.'' , '''122''' (1985) pp. 365–400</TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> St. Bell, "Biholomorphic mappings and the $\partial$ problem" ''Ann. of Math.'' , '''114''' (1981) pp. 103–113</TD></TR><TR><TD valign="top">[a3]</TD> <TD valign="top"> C. Fefferman, "The Bergman kernel and biholomorphic mappings of pseudoconvex domains" ''Inv. Math.'' , '''26''' (1974) pp. 1–65</TD></TR><TR><TD valign="top">[a4]</TD> <TD valign="top"> S.G. Krantz, "Function theory of several complex variables" , Wiley (1982) pp. Chapt. 10</TD></TR><TR><TD valign="top">[a5]</TD> <TD valign="top"> W. Rudin, "Function theory in the unit ball in $\mathbf C^n$" , Springer (1980)</TD></TR><TR><TD valign="top">[a6]</TD> <TD valign="top"> W. Rudin, "Function theory in polydiscs" , Benjamin (1969)</TD></TR><TR><TD valign="top">[a7]</TD> <TD valign="top"> Ph.A. Griffiths, "Entire holomorphic mappings in one and several variables" , ''Annals Math. Studies'' , '''85''' , Princeton Univ. Press (1976)</TD></TR></table> |
Latest revision as of 07:43, 23 August 2014
holomorphic isomorphism, holomorphism, pseudo-conformal mapping
A generalization of the concept of a univalent conformal mapping to the case of several complex variables. A holomorphic mapping of a domain $D\subset\mathbf C^n$ onto a domain $D'\subset\mathbf C^n$ is said to be a biholomorphic mapping if it is one-to-one. A biholomorphic mapping is non-degenerate in $D$; its inverse mapping is also a biholomorphic mapping.
A domain of holomorphy is mapped into a domain of holomorphy under a biholomorphic mapping; holomorphic, pluriharmonic and plurisubharmonic functions are also invariant under a biholomorphic mapping. If $n>1$, biholomorphic mappings are not conformal (except for a number of linear mappings) and the Riemann theorem is invalid for biholomorphic mappings (e.g. a ball and a polydisc in $\mathbf C^2$ cannot be biholomorphically mapped onto each other). A biholomorphic mapping of a domain $D$ onto itself is said to be a (holomorphic) automorphism; if $n>1$, there exist simply-connected domains without automorphisms other than the identity mapping.
References
| [1] | B.V. Shabat, "Introduction of complex analysis" , 1–2 , Moscow (1976) (In Russian) |
Comments
Concerning boundary behaviour of biholomorphic mappings the following results have been obtained. C. Fefferman's theorem: A biholomorphic mapping between strongly pseudo-convex domains with $C^\infty$-smooth boundary extends $C^\infty$-smoothly to a diffeomorphism between the closures of the domains, see [a3]. The same result holds if the domains are only pseudo-convex and one of them satisfies condition $R$ for the Bergman projection, see [a2]. For strongly pseudo-convex domains with $C^k$-boundary, $k>2$, $C^{k-1-\epsilon}$ extendability was obtained ($\epsilon>0$ if $k=2,3,\dots,$ $\epsilon=0$ otherwise) by L. Lempert and by S. Pinčuk. For (weakly) pseudo-convex domains with real-analytic boundary one has even holomorphic extension to a neighbourhood of the closure, see [a1]. Similar results were obtained for proper holomorphic mappings.
A biholomorphic mapping $f$ is proper (i.e. the pre-image of a compact set is compact), since $f^{-1}$ is continuous. Riemann's theorem does not hold in the following sense: There is no proper holomorphic mapping from the polydisc in $\mathbf C^n$ onto the ball in $\mathbf C^m$ for any $n,m>1$, cf. [a4]. Thus, function theory in $\mathbf C^n$, $n\geq1$, is strongly related to the domain of definition of the functions. For function theory in the (unit) ball of $\mathbf C^n$ see [a5]; for function theory in polydiscs see [a6]. For entire holomorphic mappings and their value distribution see [a7].
References
| [a1] | M.S. Baouendi, H. Jacobowitz, F. Trèves, "On the analyticity of CR mappings" Ann. of Math. , 122 (1985) pp. 365–400 |
| [a2] | St. Bell, "Biholomorphic mappings and the $\partial$ problem" Ann. of Math. , 114 (1981) pp. 103–113 |
| [a3] | C. Fefferman, "The Bergman kernel and biholomorphic mappings of pseudoconvex domains" Inv. Math. , 26 (1974) pp. 1–65 |
| [a4] | S.G. Krantz, "Function theory of several complex variables" , Wiley (1982) pp. Chapt. 10 |
| [a5] | W. Rudin, "Function theory in the unit ball in $\mathbf C^n$" , Springer (1980) |
| [a6] | W. Rudin, "Function theory in polydiscs" , Benjamin (1969) |
| [a7] | Ph.A. Griffiths, "Entire holomorphic mappings in one and several variables" , Annals Math. Studies , 85 , Princeton Univ. Press (1976) |
How to Cite This Entry:
Biholomorphic mapping. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Biholomorphic_mapping&oldid=14872
Biholomorphic mapping. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Biholomorphic_mapping&oldid=14872
This article was adapted from an original article by E.D. Solomentsev (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article