Litcius/Paper detail

On intrinsic and extrinsic rational approximation to Cantor sets

Johannes Schleischitz

2020Ergodic Theory and Dynamical Systems20 citationsDOIOpen Access PDF

Abstract

We establish various new results on a problem proposed by Mahler [Some suggestions for further research. Bull. Aust. Math. Soc. 29 (1984), 101–108] concerning rational approximation to fractal sets by rational numbers inside and outside the set in question. Some of them provide a natural continuation and improvement of recent results of Broderick, Fishman and Reich, and Fishman and Simmons. A key feature is that many of our new results apply to more general, multi-dimensional fractal sets and require only mild assumptions on the iterated function system. Moreover, we provide a non-trivial lower bound for the distance of a rational number $p/q$ outside the Cantor middle-third set $C$ to the set $C$ , in terms of the denominator $q$ . We further discuss patterns of rational numbers in fractal sets. We highlight two of them: firstly, an upper bound for the number of rational (algebraic) numbers in a fractal set up to a given height (and degree) for a wide class of fractal sets; and secondly, we find properties of the denominator structure of rational points in ‘missing-digit’ Cantor sets, generalizing claims of Nagy and Bloshchitsyn.

Topics & Concepts

FractalMathematicsIterated function systemCantor setSet (abstract data type)Rational numberJulia setAlgebraic numberRational functionCantor's diagonal argumentDiscrete mathematicsDegree (music)Sierpinski carpetIterated functionClass (philosophy)CombinatoricsPure mathematicsSierpinski triangleComputer scienceMathematical analysisArtificial intelligencePhysicsAcousticsProgramming languageMathematical Dynamics and Fractalssemigroups and automata theoryAdvanced Mathematical Theories and Applications
On intrinsic and extrinsic rational approximation to Cantor sets | Litcius