Semigroups of Isometries of the Hyperbolic Plane

Abstract: Motivated by a problem on the dynamics of compositions of plane hyperbolic isometries, we prove several fundamental results on semigroups of isometries, thought of as real Möbius transformations. We define a semigroup $S$ of Möbius transformations to be semidiscrete if the identity map is not an accumulation point of $S$. We say that $S$ is inverse free if it does not contain the identity element. One of our main results states that if $S$ is a semigroup generated by some finite collection $\mathcal{F}$ of Möb… Show more

“…We note that the elliptic locus was originally defined in [24] and [1] as the set of N -tuples whose semigroup contains an elliptic matrix (and not the identity), and Qustion 1 was stated with this definition in mind. However, the answer to the original statement of Question 1 was shown to be negative by Jacques and Short [17,Section 16]. Question 1 as we have stated it is a restatement of the questions of Yoccoz and Avila, Bochi and Yoccoz by Jacques and Short (see the last part of [17,Section 16]).…”

“…However, the answer to the original statement of Question 1 was shown to be negative by Jacques and Short [17,Section 16]. Question 1 as we have stated it is a restatement of the questions of Yoccoz and Avila, Bochi and Yoccoz by Jacques and Short (see the last part of [17,Section 16]). We also note that not all results from [24] and [1] hold for the elliptic locus as defined in Definition 1.2; for example our elliptic locus is no longer an open set.…”

“…Semigroups of Möbius transformations have been previously studied by Fried, Marotta and Stankiewitz [14], as a particular branch of the theory of semigroups of rational functions initiated by Hinkkanen and Martin [16]. Our analysis is closely related to the work of Jacques and Short [17] who further developed the material in [14] by incorporating well-known results from the theory of Fuchsian groups.…”

“…Comparing Theorems 2.1 and 3.3 we can see a geometric interpretation of the fact that the hyperbolic locus H is contained in the semidiscrete and inverse-free locus S. The two loci however are certainly not identical as the N -tuples in the following lemma, taken from [17,Lemma 10.4], demonstrate.…”

“…The semidiscrete and inverse-free properties were introduced by Jacques and Short in [17], where they were used in order to study semigroups of isometries of the hyperbolic plane. Observe that an N -tuple A is semidiscrete and inverse-free if and only if I / ∈ A where I is the 2 × 2 identity matrix.…”

Parameter spaces of locally constant cocycles

“…We note that the elliptic locus was originally defined in [24] and [1] as the set of N -tuples whose semigroup contains an elliptic matrix (and not the identity), and Qustion 1 was stated with this definition in mind. However, the answer to the original statement of Question 1 was shown to be negative by Jacques and Short [17,Section 16]. Question 1 as we have stated it is a restatement of the questions of Yoccoz and Avila, Bochi and Yoccoz by Jacques and Short (see the last part of [17,Section 16]).…”

“…However, the answer to the original statement of Question 1 was shown to be negative by Jacques and Short [17,Section 16]. Question 1 as we have stated it is a restatement of the questions of Yoccoz and Avila, Bochi and Yoccoz by Jacques and Short (see the last part of [17,Section 16]). We also note that not all results from [24] and [1] hold for the elliptic locus as defined in Definition 1.2; for example our elliptic locus is no longer an open set.…”

“…Semigroups of Möbius transformations have been previously studied by Fried, Marotta and Stankiewitz [14], as a particular branch of the theory of semigroups of rational functions initiated by Hinkkanen and Martin [16]. Our analysis is closely related to the work of Jacques and Short [17] who further developed the material in [14] by incorporating well-known results from the theory of Fuchsian groups.…”

“…Comparing Theorems 2.1 and 3.3 we can see a geometric interpretation of the fact that the hyperbolic locus H is contained in the semidiscrete and inverse-free locus S. The two loci however are certainly not identical as the N -tuples in the following lemma, taken from [17,Lemma 10.4], demonstrate.…”

“…The semidiscrete and inverse-free properties were introduced by Jacques and Short in [17], where they were used in order to study semigroups of isometries of the hyperbolic plane. Observe that an N -tuple A is semidiscrete and inverse-free if and only if I / ∈ A where I is the 2 × 2 identity matrix.…”

Parameter spaces of locally constant cocycles

The Hausdorff dimension of self-projective sets