Asymptotic Error Free Partitioning over Noisy Boolean Multiaccess Channels

Abstract

In this paper, we consider the problem of partitioning active users in a manner that facilitates multi-access without collision. The setting is of a noisy, synchronous, Boolean, multi-access channel where K active users (out of a total of N users) seek to access. A solution to the partition problem places each of the N users in one of K groups (or blocks) such that no two active nodes are in the same block. We consider a simple, but non-trivial and illustrative case of K=2 active users and study the number of steps T used to solve the partition problem. By random coding and a suboptimal decoding scheme, we show that for any T≥ (C1 +1) N, where C1 and 1 are positive constants (independent of N), and 1 can be arbitrary small, the partition problem can be solved with error probability Pe(N) 0, for large N. Under the same scheme, we also bound T from the other direction, establishing that, for any T ≤ (C2 - 2) N, the error probability Pe(N) 1 for large N; again C2 and 2 are constants and 2 can be arbitrarily small. These bounds on the number of steps are lower than the tight achievable lower-bound in terms of T ≥ (Cg +) N for group testing (in which all active users are identified, rather than just partitioned). Thus, partitioning may prove to be a more efficient approach for multi-access than group testing.