In this paper, we consider a class of symmetry groups associated to communication channels, which can informally be viewed as the transformations of the set of inputs that ``commute'' with the action of the channel. These groups were first studied by Polyanskiy in (IEEEToIT 2013). We show the simple result that the input distribution that attains the maximum mutual information for a given channel is a ``fixed point'' of its group. We conjecture (and give empirical evidence) that the channel group of the deletion channel is extremely small (it contains a number of elements constant in the blocklength). We prove a special case of this conjecture. This serves as some formal justification for why the analysis of the binary deletion channel has proved much more difficult than its memoryless counterparts.
翻译:在本文中,我们考虑了一系列与通信渠道相关的对称组,这些对称组可以非正式地被视为“commute' ” 与该频道行动有关的一组投入的转换。这些组最初由Polyanskiy在(IEETEToIT,2013年)中研究过。我们展示了一个简单的结果,即特定频道获得最大相互信息的投入分配是该频道组的一个“固定点 ” 。我们推测(并给出经验证据),删除频道的频道组非常小(它包含一些连续不变的元素 ) 。我们证明了这种推测的特殊案例。这可以作为分析二进式删除频道的难度比其无记忆的对等系统要大得多的理由。
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