Beyond Identification: Computing Boolean Functions via Channels
Abstract
Consider a point-to-point communication system in which the transmitter holds a binary message of length and transmits a corresponding codeword of length . 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 . We are interested in the asymptotic relationship of and : given , how large can 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 , characterized by the Hamming weight of functions. Our obtained results are tight in the sense of the scaling behavior for all cases of considered in the paper.
Cite
@article{arxiv.2601.12640,
title = {Beyond Identification: Computing Boolean Functions via Channels},
author = {Jingge Zhu and Matthias Frey},
journal= {arXiv preprint arXiv:2601.12640},
year = {2026}
}
Comments
Accepted to ISIT 2026