Mathematics – Complex Variables
Scientific paper
2012-04-19
Mathematics
Complex Variables
Based on the paper of L. Lempert (Intrinsic distances and holomorphic retracts, Complex analysis and applications '81 Varna, 1
Scientific paper
The aim of this paper is to present a detailed and slightly modified version of the proof of the Lempert Theorem in the case of non-planar strictly linearly convex domains with real analytic boundaries. The original Lempert's proof is presented only in proceedings of a conference with a very limited access and at some places it was quite sketchy. We were encouraged by some colleagues to prepare an extended version of the proof in which all doubts could be removed and some of details of the proofs could be simplified. We hope to have done it below. Certainly the idea of the proof belongs entirely to Lempert. Additional motivation for presenting the proof is the fact shown recently, that the so-called symmetrized bidisc may be exhausted by strictly linearly convex domains. On the other hand it cannot be exhausted by domains biholomorphic to convex ones. Therefore, the equality of the Lempert function and the Carath\'eodory distance for strictly linearly convex domains does not follow directly from the convex case.
Kosinski Lukasz
Warszawski T.
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