On "observable" Li-Yorke tuples for interval maps

Abstract

In this paper we study the set of Li-Yorke d-tuples and its d-dimensional Lebesgue measure for interval maps T [0,1] [0,1]. If a topologically mixing T preserves an absolutely continuous probability measure 9with respect to Lebesgue), then the d-tuples have Lebesgue full measure, but if T preserves an infinite absolutely continuous measure, the situation becomes more interesting. Taking the family of Manneville-Pomeau maps as example, we show that for any d 2, it is possible that the set of Li-Yorke d-tuples has full Lebesgue measure, but the set of Li-Yorke d+1-tuples has zero Lebesgue measure.