On the Capacity of the Slotted Strongly Asynchronous Channel with a Bursty User

Abstract

In this paper, the trade-off between the number of transmissions (or burstiness) Kn=en of a user, the asynchronism level An=enα in a slotted strongly asynchronous channel, and the ability to distinguish Mn=enR messages per transmission with vanishingly error probability is investigated in the asymptotic regime as blocklength n goes to infinity. The receiver must locate and decode, with vanishing error probability in n, all of the transmitted messages. Achievability and converse bounds on the trade-off among (R,α,) is derived. For cases where =0 and R=0, achievability and converse bounds coincide. A second model for a bursty user with random access in which the user may access and transmit a message in each block with probability e-nβ in then considered. Achievability and converse bounds on the trade-off between (R, α, β) is also characterized. For cases where β =α and R=0, the achievability and converse bounds match.