Linearization models for parabolic dynamical systems via Abel's functional equation

TL;DR

This paper investigates linearization models for parabolic semigroups using Abel's functional equation, introducing new limit schemes and geometric analysis to understand their asymptotic behavior and automorphism conjugates.

Contribution

It presents novel limit schemes for solving Abel's equation and characterizes geometric properties of solutions, advancing the understanding of semigroup asymptotics and automorphism models.

Findings

Established new analytic conditions for geometric properties of solutions.

Analyzed the asymptotic behavior of parabolic semigroups.

Studied the existence and geometry of backward flow invariant domains.

Abstract

We study linearization models for continuous one-parameter semigroups of parabolic type. In particular, we introduce new limit schemes to obtain solutions of Abel's functional equation and to study asymptotic behavior of such semigroups. The crucial point is that these solutions are univalent functions convex in one direction. In a parallel direction, we find analytic conditions which determine certain geometric properties of those functions, such as the location of their images in either a half-plane or a strip, and their containing either a half-plane or a strip. In the context of semigroup theory these geometric questions may be interpreted as follows: is a given one-parameter continuous semigroup either an outer or an inner conjugate of a group of automorphisms? In other words, the problem is finding a fractional linear model of the semigroup which is defined by a group of automorphisms of the open unit disk. Our results enable us to establish some new important analytic and geometric characteristics of the asymptotic behavior of one-parameter continuous semigroups of holomorphic mappings, as well as to study the problem of existence of a backward flow invariant domain and its geometry.