Concurrent Driver Gene Mutations as Negative Predictive Factors in Epidermal Growth Factor Receptor-Positive Non-Small Cell Lung Cancer

Abstract. The sharp growth and distortion theorems are established for slice monogenic extensions of univalent functions on the unit disc D ⊂ C in the setting of Clifford algebras, based on a new convex combination identity. The analogous results are also valid in the quaternionic setting for slice regular functions and we can even prove the Koebe type one-quarter theorem in this case. Our growth and distortion theorems for slice regular (slice monogenic) extensions to higher dimensions of univalent holomorphic functions hold without extra geometric assumptions, in contrast to the setting of several complex variables in which the growth and distortion theorems fail in general and hold only for some subclasses with the starlike or convex assumption.

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On Geometric Aspects of Quaternionic and Octonionic Slice Regular Functions

Wang

2017

J Geom Anal

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The purpose of this paper is twofold. One is to enrich from a geometrical point of view the theory of octonionic slice regular functions. We first prove a boundary Schwarz lemma for slice regular self-mappings of the open unit ball of the octonionic space. As applications, we obtain two Landau-Toeplitz type theorems for slice regular functions with respect to regular diameter and slice diameter respectively, together with a Cauchy type estimate. Along with these results, we introduce some new and useful ideas, which also allow to prove the minimum principle and one version of the open mapping theorem. Another is to strengthen a version of boundary Schwarz lemma first proved in [37] for quaternionic slice regular functions, with a completely new approach. Our quaternionic boundary Schwarz lemma with optimal estimate improves considerably a well-known Osserman type estimate and provides additionally all the extremal functions.2010 Mathematics Subject Classification. Primary 30G35; Secondary 30C80, 32A40, 31B25.

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Julia theory for slice regular functions

Ren

Wang

2016

Trans. Amer. Math. Soc.

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Slice regular functions have been extensively studied over the past decade, but much less is known about their boundary behavior. In this paper, we initiate the study of Julia theory for slice regular functions. More specifically, we establish the quaternionic versions of the Julia lemma, the Julia-Carathéodory theorem, the boundary Schwarz lemma, and the Burns-Krantz rigidity theorem for slice regular self-mappings of the open unit ball B and of the right half-space H + . Our quaternionic boundary Schwarz lemma involves a Lie bracket reflecting the non-commutativity of quaternions. Together with some explicit examples, it shows that the slice derivative of a slice regular self-mapping of B at a boundary fixed point is not necessarily a positive real number, in contrast to that in the complex case, meaning that its commonly believed version turns out to be totally wrong.2010 Mathematics Subject Classification. Primary 30G35; Secondary 30C80, 32A40, 31B25.

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Carathéodory Theorems for Slice Regular Functions

Ren

Wang

2014

Complex Anal. Oper. Theory

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In this paper a quaternionic sharp version of the Carathéodory theorem is established for slice regular functions with positive real part, which strengthes a weaken version recently established by D. Alpay et. al. using the Herglotz integral formula. Moreover, the restriction of positive real part can be relaxed so that the theorem becomes the quaternionic version of the Borel-Carathéodory theorem. It turns out that the two theorems are equivalent.2010 Mathematics Subject Classification. 30G35. 32A26.

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Complex geodesics and complex Monge–Ampère equations with boundary singularity

Huang

Wang

2021

Math. Ann.

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Xieping Wang

Growth and distortion theorems for slice monogenic functions

On Geometric Aspects of Quaternionic and Octonionic Slice Regular Functions

Julia theory for slice regular functions

Carathéodory Theorems for Slice Regular Functions

Complex geodesics and complex Monge–Ampère equations with boundary singularity

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