A Variation of the Koebe Mapping in a Dense Subset of S

Abstract: Let H(U) be the linear space of holomorphic functions defined on the unit disk U endowed with the topology of normal (locally uniform) convergence. For a subset E ⊂ H(U) we denote by Ē the closure of E with respect to the above topology. The topological dual space of H(U) is denoted by H′(U).Let D, 0 ∊ D, be a simply connected domain in C. The unique univalent conformal mapping ϕ from U onto D, normalized by ϕ(0) = 0 and ϕ′(0) > 0 will be called “the Riemann Mapping onto D”. Let S be the set of all normaliz… Show more

“…In particular, Corollary 1.2 disproves a conjecture of Bombieri [Bom67], p. 51 (see also [BH85], [BH87]), which asserts that…”

On support points of univalent functions and a disproof of a conjecture of Bombieri

“…In particular, Corollary 1.2 disproves a conjecture of Bombieri [Bom67], p. 51 (see also [BH85], [BH87]), which asserts that…”

On support points of univalent functions and a disproof of a conjecture of Bombieri

“…Bombieri's conjecture is true for the class S R , see the proof due to Bshouty and Hengartner in [52]. The inequality σ mn B mn was proved in [48] for all m, n 2.…”

Value Regions in Classes of Conformal Mappings

“…Since for each fixed ω ∈ Ω it may be regarded as an ordinary differential equation, the sample paths t → φ t (z, ω) have continuous first derivatives for almost all ω. See an example of a sample path of φ t (0, ω) for Taking into account the fact that Ee ikB t (ω) = e − 1 2 tk 2 , we can also write the expression for the mean function Eφ t (z, ω) (47) Eφ t (z, ω) = e −t (z + t), k 2 = 2, e −t z + e −tk 2 /2 −e −t 1−k 2 /2 , otherwise. Thus, in this example all maps φ t and Eφ t are affine transformations (compositions of a scaling and a translation).…”

Classical and Stochastic Löwner–Kufarev Equations