Non-smooth saddle-node bifurcations II: Dimensions of strange attractors

Abstract: We study the geometric and topological properties of strange non-chaotic attractors created in non-smooth saddle-node bifurcations of quasiperiodically forced interval maps. By interpreting the attractors as limit objects of the iterates of a continuous curve and controlling the geometry of the latter, we determine their Hausdorff and box-counting dimension and show that these take distinct values. Moreover, the same approach allows to describe the topological structure of the attractors and to prove their min… Show more

“…With this article, we show that in many cases the measures corresponding to strange non-chaotic attractors are in fact one-rectifiable, that is, they are absolutely continuous with respect to the restriction of the one-dimensional Hausdorff measure to a countable union of Lipschitz graphs (see Section 2.1 for the exact definition). Similar results have already been obtained in previous studies [5,6]. However, the underlying geometric picture of the proof in the present case differs to a large extent and makes the authors believe that rectifiability should be expected also in more general situations.…”

“…In this setting, Young [16] and Bjerklöv [17,18] developed powerful methods-in the spirit of the multiscale analysis and parameter exclusion techniques by Benedicks and Carleson [19]-to examine the occurrence and properties of SNA's. These methods had later been adapted to non-linear systems (such as ( * )) in [20,21,22,6].…”

“…Proposition 3.1). On a combinatorial level, the strategy we pursue has been applied successfully to ergodic measures supported on SNA/SNR-pairs that occur in so-called saddle-node bifurcations of qpf monotone interval maps [6]. These are skew-products similar to ( * ) but defined on T 1 × [0, 1] and such that the maps f θ (·) are monotonously increasing (for each fixed θ ∈ T 1 ).…”

“…These are skew-products similar to ( * ) but defined on T 1 × [0, 1] and such that the maps f θ (·) are monotonously increasing (for each fixed θ ∈ T 1 ). We will thus be able to recycle the rather technical combinatorial findings of [6].…”

Rectifiability of a class of invariant measures with one non-vanishing Lyapunov exponent

“…With this article, we show that in many cases the measures corresponding to strange non-chaotic attractors are in fact one-rectifiable, that is, they are absolutely continuous with respect to the restriction of the one-dimensional Hausdorff measure to a countable union of Lipschitz graphs (see Section 2.1 for the exact definition). Similar results have already been obtained in previous studies [5,6]. However, the underlying geometric picture of the proof in the present case differs to a large extent and makes the authors believe that rectifiability should be expected also in more general situations.…”

“…In this setting, Young [16] and Bjerklöv [17,18] developed powerful methods-in the spirit of the multiscale analysis and parameter exclusion techniques by Benedicks and Carleson [19]-to examine the occurrence and properties of SNA's. These methods had later been adapted to non-linear systems (such as ( * )) in [20,21,22,6].…”

“…Proposition 3.1). On a combinatorial level, the strategy we pursue has been applied successfully to ergodic measures supported on SNA/SNR-pairs that occur in so-called saddle-node bifurcations of qpf monotone interval maps [6]. These are skew-products similar to ( * ) but defined on T 1 × [0, 1] and such that the maps f θ (·) are monotonously increasing (for each fixed θ ∈ T 1 ).…”

“…These are skew-products similar to ( * ) but defined on T 1 × [0, 1] and such that the maps f θ (·) are monotonously increasing (for each fixed θ ∈ T 1 ). We will thus be able to recycle the rather technical combinatorial findings of [6].…”

Rectifiability of a class of invariant measures with one non-vanishing Lyapunov exponent

“…We therefore conjecture that the transition is an effect of the near-quasiperiodic modulation of the basic periodic forcing studied in this paper, which is present in the astronomical forcing, resulting in a more complicated version of the rate-induced tipping phenomenon obtained for the step-wise amplitude modulation (12). This may require application of the general quasiperiodic theory of Fuhrmann et al [14] or the pullback attractor framework outlined in Chekroun et al [7]. This appendix gives a brief explanation for the extension of the phase space of DDEs, from which we permit initial conditions of the stroboscopic map M in subsections 3.2 to 3.4.…”

Effects of Periodic Forcing on a Paleoclimate Delay Model

Nonautonomous Bifurcation