We consider for each the set of points of the circle whose forward orbit for the doubling map does not intersect , and look at the dimension function . We prove that at every bifurcation parameter , the local Hölder exponent of the dimension function equals the value of the function itself. A similar statement holds for general expanding maps of the circle: Namely, we consider the topological entropy of the map restricted to the survival set, and obtain bounds on its local Hölder exponent in terms of the value of the function.
The local Hölder exponent for the dimension of invariant subsets of the circle / Carminati, C.; Tiozzo, G.. - In: ERGODIC THEORY & DYNAMICAL SYSTEMS. - ISSN 0143-3857. - 37:6(2017), pp. 1825-1840. [10.1017/etds.2015.135]
The local Hölder exponent for the dimension of invariant subsets of the circle
Tiozzo G.
2017
Abstract
We consider for each the set of points of the circle whose forward orbit for the doubling map does not intersect , and look at the dimension function . We prove that at every bifurcation parameter , the local Hölder exponent of the dimension function equals the value of the function itself. A similar statement holds for general expanding maps of the circle: Namely, we consider the topological entropy of the map restricted to the survival set, and obtain bounds on its local Hölder exponent in terms of the value of the function.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
