科学研究
报告题目:

Quantitative recurrence properties for piecewise expanding maps on [0,1]^d

报告人:

何育彬(华南理工大学)

报告时间:

报告地点:

金沙9001cc诚为本东北楼四楼报告厅(404)

报告摘要:

The classic Poincare recurrence theorem states that for certain measure-preserving dynamical systems, generic points, after sufficiently long but finite iterations of T, will return to a neighborhood arbitrarily close to themselves. This is a qualitative result in nature with no quantitative information. In 1993, Boshernitzan obtained a quantitative result which relates the recurrence rate to the Hausdorff dimension of the metric space. This result was further refined in some dynamical systems, especially conformal dynamical systems with nice mixing properties. In this talk, we will discuss the quantitative recurrence properties for piecewise expanding maps (non-conformal dynamical systems). Part of this work is motivated by the classical theories of weighted Diophantine approximation and multiplicative Diophantine approximation. This is a joint work with Lingmin Liao.