In this paper, we examine the Renyi entropy rate of stationary ergodic processes. For a special class of stationary ergodic processes, we prove that the Renyi entropy rate always exists and can be polynomially approximated by its defining sequence; moreover, using the Markov approximation method, we show that the Renyi entropy rate can be exponentially approximated by that of the Markov approximating sequence, as the Markov order goes to infinity. For the general case, by constructing a counterexample, we disprove the conjecture that the Renyi entropy rate of a general stationary ergodic process always converges to its Shannon entropy rate as {\alpha} goes to 1.
翻译:在本文中,我们检查了固定的ERgodic过程的Renyi entropy entrapy 。 对于特殊一类的固定的ERgodic过程,我们证明Renyi entropy 一直存在,并且可以按其定义序列进行多元近似;此外,使用Markov近似法,我们表明,Renyi entropy 率可以按Markov 相近序列的指数近似,因为Markov 命令是无限的。对于一般情况,我们通过建立反比例,我们否定了这样的假设,即普通固定的ERgodic 过程的Renyi entropy 率总是与香农的 entro entropy 率相汇合,作为 yalpha} 将达到 1。
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