This paper considers a Strongly Asynchronous and Slotted Massive Access
Channel (SAS-MAC) where $K_n:=e^{n u}$ different users transmit a randomly
selected message among $M_n:=e^{nR}$ ones within a strong asynchronous window
of length $A_n:=e^{n\alpha}$ blocks, where each block lasts $n$ channel uses. A
global probability of error is enforced, ensuring that all the users'
identities and messages are correctly identified and decoded. Achievability
bounds are derived for the case that different users have similar channels, the
case that users' channels can be chosen from a set which has polynomially many
elements in the blocklength $n$, and the case with no restriction on the users'
channels. A general converse bound on the capacity region and a converse bound
on the maximum growth rate of the number of users are derived.
History
Citation
Shahi, S., Tuninetti, D.Devroye, N. (2018). The Strongly Asynchronous Massive Access Channel. CoRR, abs/1807.09934. Retrieved from http://arxiv.org/abs/1807.09934v1