We consider here the Byzantine agreement problem in synchronous systems with homonyms. In this model different processes may have the same authenticated identifier. In such a system of n processes sharing a set of l identifiers, we define a distribution of the identifiers as an integer partition of n into l parts n_1,..., n_l giving for each identifier i the number of processes having this identifier. Assuming that the processes know the distribution of identifiers we give a necessary and sufficient condition on the integer partition of n to solve the Byzantine agreement with at most t Byzantine processes. Moreover we prove that there exists a distribution of l identifiers enabling to solve Byzantine agreement with at most t Byzantine processes if and only if l >((n-t-min(t,r)/(n-r)t)) where r = n mod l. This bound is to be compared with the l > 3i bound proved in [4] when the processes do not know the distribution of identifiers.
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机译:我们在这里考虑具有同音异义的同步系统中的拜占庭协议问题。在此模型中,不同的过程可能具有相同的身份验证标识符。在共享一组l个标识符的n个进程的这种系统中,我们将标识符的分布定义为n的整数分区为l个部分n_1,...,n_l,从而为每个标识符i提供具有该标识符的进程数。假设进程知道标识符的分布,我们对n的整数分区给出一个充要条件,以解决最多t个拜占庭进程的拜占庭协议。此外,我们证明存在且仅当l>((nt-min(t,r)/(nr)t))(其中r = n mod)时,标识符标识符的分布最多可以解决t个拜占庭过程。 l。当进程不知道标识符的分布时,将该边界与[4]中证明的l> 3i边界进行比较。
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