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引用次数: 0
摘要
我们证明,由函数$f(x)=a(x-1/2)$与$a/neq 0$给出的循环的斜积对于基内的每一个遍历对称IET都是遍历的,从而给出了这个家族中遍历扩展的全部特征。此外,我们还证明,在 IET 唯一遍历性的额外自然假设下,我们可以用任何具有非零跳跃之和的可微函数来代替 $f$。最后,通过考虑弱混合 IET 而不是仅仅考虑遍历性,我们证明了由 $f$ 给定循环的斜积具有无限遍历指数。
Ergodic properties of infinite extension of symmetric interval exchange transformations
We prove that skew products with the cocycle given by the function
$f(x)=a(x-1/2)$ with $a\neq 0$ are ergodic for every ergodic symmetric IET in
the base, thus giving the full characterization of ergodic extensions in this
family. Moreover, we prove that under an additional natural assumption of
unique ergodicity on the IET, we can replace $f$ with any differentiable
function with a non-zero sum of jumps. Finally, by considering weakly mixing
IETs instead of just ergodic, we show that the skew products with cocycle given
by $f$ have infinite ergodic index.
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