مرکز منطقه ای اطلاع رساني علوم و فناوري

Abstract :

In this paper, we investigate the problem of optimizing the expurgated upper bound to the probability of error associated with transmission over discrete memoryless channels. We find a general sufficient condition under which, for a given value of the parameter $\\varrho \\varepsilon [1, \\infty )$ , the channel input distribution that leads to the optimal exponent corresponds to a constant memoryless source. We then derive a necessary and sufficient condition that the above property holds for all $1 \\leq \\varrho < \\infty$ (even then, different values of o would, in general, induce different optimal input distributions). Finally, we define a class of equidistant channels that includes all binary input channels, and show that for this class and all $\\varrho \\varepsilon [1, \\infty )$ the optimal expurgated exponent is attained by the uniform distribution over the inputs.