LEADER 05818nam 22006613 450 001 9910915796303321 005 20240723141844.0 010 $a1-4704-7544-8 035 $a(MiAaPQ)EBC30671911 035 $a(Au-PeEL)EBL30671911 035 $a(PPN)272106828 035 $a(CKB)27902413300041 035 $a(EXLCZ)9927902413300041 100 $a20230804d2023 uy 0 101 0 $aeng 135 $aurcnu|||||||| 181 $ctxt$2rdacontent 182 $cc$2rdamedia 183 $acr$2rdacarrier 200 10$aOverlapping Iterated Function Systems from the Perspective of Metric Number Theory 205 $a1st ed. 210 1$aProvidence :$cAmerican Mathematical Society,$d2023. 210 4$dİ2023. 215 $a1 online resource (108 pages) 225 1 $aMemoirs of the American Mathematical Society Series ;$vv.287 311 08$aPrint version: Baker, Simon Overlapping Iterated Function Systems from the Perspective of Metric Number Theory Providence : American Mathematical Society,c2023 9781470464400 327 $aCover -- Title page -- Chapter 1. Introduction -- 1.1. Attractors generated by iterated function systems -- 1.2. Diophantine approximation and metric number theory -- 1.3. Two families of limsup sets -- 1.3.1. The set _{?}( ,?) -- 1.3.2. The set _{?}( ,\m,?) -- Chapter 2. Statement of results -- 2.1. Parameterised families with variable contraction ratios -- 2.2. Parameterised families with variable translations -- 2.3. A specific family of IFSs -- 2.3.1. New methods for distinguishing between the overlapping behaviour of IFSs -- 2.4. The CS property and absolute continuity. -- 2.5. Overlapping self-conformal sets -- 2.6. Structure of the paper -- Chapter 3. Preliminary results -- 3.1. A general framework -- 3.1.1. Verifying the hypothesis of Proposition 3.1. -- 3.1.2. The non-existence of a Khintchine like result -- 3.2. Full measure statements -- Chapter 4. Applications of Proposition 3.1 -- 4.1. Proof of Theorem 2.2 -- 4.1.1. Bernoulli convolutions -- 4.1.2. The {0,1,3} problem -- 4.2. Proof of Theorem 2.9 -- Chapter 5. A specific family of IFSs -- Chapter 6. Proof of Theorem 2.15 -- Chapter 7. Proof of Theorem 2.16 -- Chapter 8. Applications of the mass transference principle -- Chapter 9. Examples -- 9.1. IFSs satisfying the CS property -- 9.2. The non-existence of Khintchine like behaviour without exact overlaps -- Chapter 10. Final discussion and open problems -- Acknowledgments -- Bibliography -- Back Cover. 330 $a"In this paper we develop a new approach for studying overlapping iterated function systems. This approach is inspired by a famous result due to Khintchine from Diophantine approximation which shows that for a family of limsup sets, their Lebesgue measure is determined by the convergence or divergence of naturally occurring volume sums. For many parameterised families of overlapping iterated function systems, we prove that a typical member will exhibit similar Khintchine like behaviour. Families of iterated function systems that our results apply to include those arising from Bernoulli convolutions, the [numbers] problem, and affine contractions with varying translation parameter. As a by-product of our analysis we obtain new proofs of some well known results due to Solomyak on the absolute continuity of Bernoulli convolutions, and when the attractor in the [numbers] problem has positive Lebesgue measure. For each [equation] we let [phi]t be the iterated function system given by [equation]. We prove that either [phi]t contains an exact overlap, or we observe Khintchine like behaviour. Our analysis shows that by studying the metric properties of limsup sets, we can distinguish between the overlapping behaviour of iterated function systems in a way that is not available to us by simply studying properties of self-similar measures. Last of all, we introduce a property of an iterated function system that we call being consistently separated with respect to a measure. We prove that this property implies that the pushforward of the measure is absolutely continuous. We include several explicit examples of consistently separated iterated function systems"--$cProvided by publisher. 410 0$aMemoirs of the American Mathematical Society Series 606 $aIterative methods (Mathematics) 606 $aNumber theory 606 $aMeasure theory 606 $aDiophantine approximation 606 $aFractals 606 $aDynamics$xMathematical models 606 $aNumber theory -- Probabilistic theory: distribution modulo $1$; metric theory of algorithms -- Diophantine approximation$2msc 606 $aMeasure and integration -- Classical measure theory -- Fractals$2msc 606 $aDynamical systems and ergodic theory -- Smooth dynamical systems: general theory -- Dimension theory of dynamical systems$2msc 615 0$aIterative methods (Mathematics) 615 0$aNumber theory. 615 0$aMeasure theory. 615 0$aDiophantine approximation. 615 0$aFractals. 615 0$aDynamics$xMathematical models. 615 7$aNumber theory -- Probabilistic theory: distribution modulo $1$; metric theory of algorithms -- Diophantine approximation. 615 7$aMeasure and integration -- Classical measure theory -- Fractals. 615 7$aDynamical systems and ergodic theory -- Smooth dynamical systems: general theory -- Dimension theory of dynamical systems. 676 $a518/.26 676 $a518.26 686 $a11K60$a28A80$a37C45$2msc 700 $aBaker$b Simon$01387917 801 0$bMiAaPQ 801 1$bMiAaPQ 801 2$bMiAaPQ 906 $aBOOK 912 $a9910915796303321 996 $aOverlapping Iterated Function Systems from the Perspective of Metric Number Theory$94303367 997 $aUNINA