共查询到18条相似文献,搜索用时 78 毫秒
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Nehari函数族的偏差定理与拟共形延拓 总被引:2,自引:0,他引:2
本文讨论了Nehari函数族的偏差性质,得到了这类函数及其导数的若干偏差定理,同时研究了这类函数的拟共形延拓,并给出拟共形延拓的精确表达式. 相似文献
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研究某一Nehari函数族的偏差性质,得到这类函数族的H?lder连续性及若干偏差定理,同时讨论了该函数类的拟共形延拓问题,并给出拟共形延拓的复伸张估计,推广了杨宗信等人相应的结论. 相似文献
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本文得到了关于Faber多项式的一些收敛性质并应用它们来研究具有拟共形延拓的单叶函数,特别地,通过引入l^2空间上的一个有界线性算子,可以给出单叶函数的拟共形延拓性和渐近共形性的若干刻画. 相似文献
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冯小高 《纯粹数学与应用数学》2016,32(2):119-126
分别借助解析函数与调和函数两类函数的Dirichlet积分,利用相关文献给定边界值的拟共形映射极值伸缩商的估计方法,通过有限偏差函数和拟共形映射的关系估计了具有给定边界值的有限偏差函数的极值伸缩商.得到了解析函数的Dirichlet积分在有限偏差函数下具有拟不变性,同时给出有限偏差函数极值伸缩商的下界估计. 相似文献
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获得了Ramanujan模方程奇异值的若干性质 (包括渐近精确的界 ) ,并由此得出了Hersch Pflugerφ-偏差函数和Agardη-偏差函数的无穷乘积表示 ,改进了显式拟共形Schwarz引理 ,获得了Schottky上界新型的渐近精确的估计 ,证实了关于线性偏差函数的一个猜测 相似文献
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近年来,很多学者将解析函数的结果推广到调和函数,利用调和函数的Schwarz导数的范数的范围以及调和函数的延拓公式的Beltrami系数,证明该延拓公式能够拟共形延拓到■.本文将根据聂丽萍和杨宗信给出的Schwarz导数的新定义,利用Efraimidis等人的方法,估计出Schwarz导数的范数的范围.进一步借助此范数的上界估计证明在Schwarz导数的新定义下,Efraimidis等人给出的调和函数的Alhfors-Weill延拓公式仍成立. 相似文献
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得到了实轴R上的保向同胚φ(x)在Beurling-Ahlfors延拓下是调和拟共形的充要条件.利用poisson积分具体给出了一个φ(x)延拓成上半平面到其自身的调和同胚.并且给出了这个调和同胚为拟共形的一个充分条件,得到了它的伸张估计.所得结果推广了Michalski的相关结果. 相似文献
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<正> 近十多年来,人们对具有拟共形扩张的种种单叶函数之度量的和几何的性质之研究表现了很大的兴趣,如 O.Lehto,J.O.Mcleavey,M.Schiffer 和 G.Schober 等等.本文的目的在于用具有拟共形扩张的面积原理方法,研究二类具有拟共形扩张的比伯霸赫(L.Bieberbach)函数,给出了这种函数族的 Golusin 不等式、Grunsky 不等式,指数化的 Golusin 偏差定理和 FitzGerald 不等式,以及 Schwarz 导数的估计等一系列结果.当 k→1时,它们就退化成关于比伯霸赫函数族的相应的结果[3]、[5]. 相似文献
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Modular equations occur in number theory, but it is less known that such equations also occur in the study of deformation
properties of quasiconformal mappings. The authors study two important plane quasiconformal distortion functions, obtaining
monotonicity and convexity properties, and finding sharp bounds for them. Applications are provided that relate to the quasiconformal
Schwarz Lemma and to Schottky’s Theorem. These results also yield new bounds for singular values of complete elliptic integrals.
相似文献
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The Distortion Theorem for Quasiconformal Mappings, Schottky's Theorem and Holomorphic Motions 总被引:6,自引:0,他引:6
G. J. Martin 《Proceedings of the American Mathematical Society》1997,125(4):1095-1103
We prove the equivalence of Schottky's theorem and the distortion theorem for planar quasiconformal mappings via the theory of holomorphic motions. The ideas lead to new methods in the study of distortion theorems for quasiconformal mappings and a new proof of Teichmüller's distortion theorem.
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For a self mapping f: D→D of the unit disk in C which has finite distortion, we give a separation condition on the components of the set where the distortion is very large - say greater than a given constant - which implies that f still extends homeomorphically and quasisymmetrically to the boundary S = ?D. Thus f shares its boundary values with a quasiconformal mapping whose distortion we explicitly estimate in terms of the data. This condition, uniformly separated in modulus, allows the set where the distortion is large to accumulate on the entire boundary S, but it does not allow a component to run out to the boundary - a necessary restriction. The lift of a Jordan domain in a Riemann surface to its universal cover D is always uniformly separated in modulus, and this allows us to apply these results in the theory of Riemann surfaces to identify an interesting link between the support of the high distortion of a map between surfaces and their geometry - again with explicit estimates. As part of our investigations, we study mappings ?: S → S which are the germs of a conformal mapping and give good bounds on the distortion of a quasiconformal extension of ? to the disk D. We then extend these results to the germs of quasisymmetric mappings. These appear of independent interest and identify new geometric invariants. 相似文献
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In their paper [17], Sullivan and Thurston introduced the notion of quasiconformal motions, and proved an extension theorem for quasiconformal motions over an interval. We prove some new properties of (normalized) quasiconformal motions of a closed set E in the Riemann sphere, over connected Hausdorff spaces. As a spin-off, we strengthen the result of Sullivan and Thurston, and show that if a quasiconformal motion of E over an interval has a certain group-equivariance property, then the extended quasiconformal motion can be chosen to have the same group-equivariance property. Our main theorem proves a result on isomorphisms of continuous families of Möbius groups arising from a group-equivariant quasiconformal motion of E over a path-connected Hausdorff space. Our techniques connect the Teichmüller space of the closed set E with quasiconformal motions of E. 相似文献
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The distortion property of hyperbolic area of planar quasiconformal mappings is studied in this paper.In the case of radial quasiconformal mappings and angular deformed quasiconformal mappings their hyperbolic area distortions are estimated quite sharply.The result can be applied to judge whether the hyperbolic area of a planar subset is explodable. 相似文献
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Zoltán M. Balogh 《Journal d'Analyse Mathématique》2001,83(1):289-312
We construct quasiconformal mappings on the Heisenberg group which change the Hausdorff dimension of Cantor-type sets in an
arbitrary fashion. On the other hand, we give examples of subsets of the Heisenberg group whose Hausdorff dimension cannot
be lowered by any quasiconformal mapping. For a general set of a certain Hausdorff dimension we obtain estimates of the Hausdorff
dimension of the image set in terms of the magnitude of the quasiconformal distortion. 相似文献
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New better estimates, which are given in terms of elementary functions, for the function r → (2/π)(1 - r2)K(r)K (r) + log r appearing in Hübner's sharp upper bound for the Hersch-Pfluger distortion function are obtained. With these estimates, some known bounds for the Hersch-Pfluger distortion function in quasiconformal theory are improved, thus improving the explicit quasiconformal Schwarz lemma and some known estimates for the solutions to the Ramanujan modular equations. 相似文献
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