{"title":"The Sharp Distortion Estimate Concerning Julia’s Lemma","authors":"Shota Hoshinaga, Hiroshi Yanagihara","doi":"10.1007/s40315-023-00505-4","DOIUrl":null,"url":null,"abstract":"<p>For <span>\\(\\alpha > 0\\)</span>, let <span>\\(J_\\alpha \\)</span> be the class of all analytic functions <i>f</i> in the unit disk <span>\\({\\mathbb {D}}: = \\{ z \\in {\\mathbb {C}}: |z| < 1 \\}\\)</span> satisfying <span>\\(f({\\mathbb {D}}) \\subset {\\mathbb {D}}\\)</span> with the the angular derivative </p><span>$$\\begin{aligned} \\angle \\lim _{z \\rightarrow 1} \\frac{f(z)-1}{z-1} = \\alpha . \\end{aligned}$$</span><p>For <span>\\(a,z\\in \\mathbb {D}\\)</span>, let </p><span>$$\\begin{aligned} k(z) = \\frac{|1-z|^2}{1-|z|^2}\\quad \\text {and}\\quad \\sigma _a(z) = \\frac{1-\\overline{a}}{1-a} \\frac{z-a}{1-\\overline{a}z}. \\end{aligned}$$</span><p>Let <span>\\(z_0 \\in {\\mathbb {D}}\\)</span> be fixed. For <span>\\(f \\in J_\\alpha \\)</span>, we obtain the sharp estimate </p><span>$$\\begin{aligned} |f'(z_0)| \\le \\frac{4 \\alpha k(z_0)^2}{(\\alpha k(z_0)+1)^2 |1-z_0|^2} \\qquad \\text {when }\\alpha k(z_0) \\le 1, \\end{aligned}$$</span><p>with equality if and only if <span>\\(f = \\sigma _{w_0}^{-1} \\circ \\sigma _{z_0}\\)</span>. Here <span>\\(w_0 = (1-\\alpha k(z_0))/(\\alpha k(z_0) +1)\\)</span>. In case of <span>\\(\\alpha k(z_0) > 1\\)</span> we derive the estimate <span>\\(|f'(z_0)| \\le k(z_0)/|1-z_0|^2\\)</span>. It is also sharp, however in contrast to the former case, there are no extremal functions in <span>\\(J_\\alpha \\)</span>. The lack of extremal functions is caused by the fact that <span>\\(J_\\alpha \\)</span> is not closed in the topology of local uniform convergence in <span>\\({\\mathbb {D}}\\)</span>. Thus we consider the closure <span>\\(\\bar{J}_\\alpha \\)</span> of <span>\\(J_\\alpha \\)</span> and study <span>\\(\\bar{V}_1(z_0, \\alpha ):= \\{ f'(z_0): f \\in \\bar{J}_\\alpha \\}\\)</span> which is the variability region of <span>\\(f'(z_0)\\)</span> when <i>f</i> ranges over <span>\\(\\bar{J}_\\alpha \\)</span>. We shall show that <span>\\(\\partial \\bar{V}_1(z_0, \\alpha )\\)</span> is a simple closed curve and <span>\\(\\bar{V}_1(z_0, \\alpha )\\)</span> is a convex and closed Jordan domain enclosed by <span>\\(\\partial \\bar{V}_1(z_0, \\alpha )\\)</span>. Moreover, we shall give a parametric representation of <span>\\(\\partial \\bar{V}_1(z_0, \\alpha )\\)</span> and determine all extremal functions.</p>","PeriodicalId":49088,"journal":{"name":"Computational Methods and Function Theory","volume":"335 ","pages":""},"PeriodicalIF":0.6000,"publicationDate":"2023-11-21","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Computational Methods and Function Theory","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1007/s40315-023-00505-4","RegionNum":4,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q3","JCRName":"MATHEMATICS","Score":null,"Total":0}
引用次数: 0
Abstract
For \(\alpha > 0\), let \(J_\alpha \) be the class of all analytic functions f in the unit disk \({\mathbb {D}}: = \{ z \in {\mathbb {C}}: |z| < 1 \}\) satisfying \(f({\mathbb {D}}) \subset {\mathbb {D}}\) with the the angular derivative
with equality if and only if \(f = \sigma _{w_0}^{-1} \circ \sigma _{z_0}\). Here \(w_0 = (1-\alpha k(z_0))/(\alpha k(z_0) +1)\). In case of \(\alpha k(z_0) > 1\) we derive the estimate \(|f'(z_0)| \le k(z_0)/|1-z_0|^2\). It is also sharp, however in contrast to the former case, there are no extremal functions in \(J_\alpha \). The lack of extremal functions is caused by the fact that \(J_\alpha \) is not closed in the topology of local uniform convergence in \({\mathbb {D}}\). Thus we consider the closure \(\bar{J}_\alpha \) of \(J_\alpha \) and study \(\bar{V}_1(z_0, \alpha ):= \{ f'(z_0): f \in \bar{J}_\alpha \}\) which is the variability region of \(f'(z_0)\) when f ranges over \(\bar{J}_\alpha \). We shall show that \(\partial \bar{V}_1(z_0, \alpha )\) is a simple closed curve and \(\bar{V}_1(z_0, \alpha )\) is a convex and closed Jordan domain enclosed by \(\partial \bar{V}_1(z_0, \alpha )\). Moreover, we shall give a parametric representation of \(\partial \bar{V}_1(z_0, \alpha )\) and determine all extremal functions.
期刊介绍:
CMFT is an international mathematics journal which publishes carefully selected original research papers in complex analysis (in a broad sense), and on applications or computational methods related to complex analysis. Survey articles of high standard and current interest can be considered for publication as well.