Beyond Identification: Computing Boolean Functions via Channels
For information theory researchers, it extends the theoretical understanding of communication beyond message identification to function computation, with tight scaling results.
This paper generalizes the identification-via-channels framework to computing Boolean functions, defining computation capacity and deriving tight achievability and converse results for function classes characterized by Hamming weight.
Consider a point-to-point communication system in which the transmitter holds a binary message of length $m$ and transmits a corresponding codeword of length $n$. The receiver's goal is to recover a Boolean function of that message, where the function is unknown to the transmitter, but chosen from a known class $F$. We are interested in the asymptotic relationship of $m$ and $n$: given $n$, how large can $m$ be (asymptotically), such that the value of the Boolean function can be recovered reliably? This problem generalizes the identification-via-channels framework introduced by Ahlswede and Dueck. We formulate the notion of computation capacity, and derive achievability and converse results for selected classes of functions $F$, characterized by the Hamming weight of functions. Our obtained results are tight in the sense of the scaling behavior for all cases of $F$ considered in the paper.