Abstract
We prove exponential weak Bernoulli mixing for invariant measures of certain piecewise monotone interval maps studied in [BK] and [KN]. In particular we prove this for unimodal maps with negative Schwarzian derivative satisfying lim $$lim inf_{n \to \infty } \sqrt[n]{{\left| {DT^n (Tc)} \right|}} > 1$$ , wherec is the unique critical point ofT.
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