Earle–Hamilton fixed-point theorem: Difference between revisions

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Line 1: In [[mathematics]], the '''Earle–Hamilton fixed point theorem''' is a result in [[geometric function theory]] giving sufficient conditions for a [[holomorphic mapping]] of an open ___domain in a complex [[Banach space]] into itself to have a fixed point. The result was proved in 1968 by Clifford Earle and [[Richard ~~Hamilton (mathematician)\|Richard~~S. Hamilton]] by showing that, with respect to the [[Carathéodory metric]] on the ___domain, the holomorphic mapping becomes a [[contraction mapping]] to which the [[Banach fixed-point theorem]] can be applied. ==Statement== Let ''D'' be a connected open subset of a complex [[Banach space]] ''X'' and let ''f'' be a holomorphic mapping of ''D'' into itself such that: the image ''f''(''D'') is bounded in norm; Line 9 ⟶ 10: ==Proof== Replacing ''D'' by an ε-neighbourhood of ''f''(''D''), it can be assumed that ''D'' is itself bounded in norm. For ''z'' in ''D'' and ''v'' in ''X'', set Line 29 ⟶ 30: If the diameter of ''D'' is less than ''R'' then, by taking suitable holomorphic functions ''g'' of the form :<math>\displaystyle{g(z)=a(z) + b}</math> with ''a'' in ''X'' and ''b'' in '''C''', it follows that Line 63 ⟶ 64: The Banach fixed-point theorem can be applied to the restriction of ''f'' to the closure of ''f''(''D'') on which ''d'' defines a complete metric, defining the same topology as the norm. ==Other holomorphic fixed point theorems== In finite dimensions the existence of a fixed point can often be deduced from the [[Brouwer fixed point theorem]] without any appeal to holomorphicity of the mapping. In the case of [[bounded symmetric ___domain]]s with the [[Bergman metric]], {{harvtxt\|Neretin\|1996}} and {{harvtxt\|Clerc\|~~1999~~1998}} showed that the same scheme of proof as that used in the Earle-Hamilton theorem applies. The bounded symmetric ___domain ''D'' = ''G'' / ''K'' is a complete metric space for the Bergman metric. The open semigroup of the complexification ''G''<sub>''c''</sub> taking the closure of ''D'' into ''D'' acts by [[contraction mapping]]s, so again the Banach fixed-point theorem can be applied. Neretin extended this argument by continuity to some infinite-dimensional bounded symmetric domains, in particular the Siegel generalized disk of symmetric Hilbert-Schmidt operators with operator norm less than 1. The Earle-Hamilton theorem applies equally well in this case. ==References== {{citation\|~~last~~last1=Earle\|~~first~~first1= Clifford J.\|last2=Hamilton\|first2= Richard S.\| title=A fixed point theorem for holomorphic mappings\|year= 1970\|series=Proc. Sympos. Pure Math.\|volume= XVI\|pages= 61–65\|publisher =American ~~Mathemetical~~Mathematical Society}} {{citation\|last=Harris\|first= Lawrence A.\|title=Fixed points of holomorphic mappings for domains in Banach spaces\|journal=Abstr. Appl. Anal.\|year= 2003\|volume= 5\| pages=261–274\|url=http://www.hindawi.com/journals/aaa/2003/121329/abs/}} {{citation\|last=Neretin\|first= Y. A.\|title=Categories of symmetries and infinite-dimensional groups\|series= London Mathematical Society Monographs\|volume=16\|publisher= Oxford University Press\|year= 1996\|isbn=0-19-851186-8}} {{citation\|last=Clerc\|first=Jean-Louis\|title=Compressions and contractions of Hermitian symmetric spaces\|journal=Math. Z.\|volume= 229\|year=1998\|pages=1–8\|~~url~~doi=~~http://www~~10.~~springerlink.com/content/29yxnqe2ph9y4hhk~~1007/pl00004648\|s2cid=122333415}} {{DEFAULTSORT:Earle-Hamilton fixed-point theorem}} ~~{{mathematics-stub}}~~ [[Category:~~Functional~~Theorems in complex analysis]] ~~[[Category:Complex analysis]]~~ ~~[[Category:Mathematical theorems]]~~ [[Category:Fixed-point theorems]]