Local Rank of Ergodic Symmetric n-Powers does not exceed n!n^(-n)
classification
🧮 math.DS
keywords
rankergodicexceedlocalodotprovesymmetricbound
read the original abstract
We prove that local rank of an ergodic symmetric power $T^{\odot n}$ does not exceed $n!n^{-n}$. A. Katok's old results show that this upper bound is exact. We prove also that $T^{\odot n}$ has infinite Rank as $n>1$.
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