English

Preserving Privacy while Broadcasting: $k$-Limited-Access Schemes

Information Theory 2018-10-16 v1 math.IT

Abstract

Index coding employs coding across clients within the same broadcast domain. This typically assumes that all clients learn the coding matrix so that they can decode and retrieve their requested data. However, learning the coding matrix can pose privacy concerns: it may enable clients to infer information about the requests and side information of other clients [1]. In this paper, we formalize the intuition that the achieved privacy can increase by decreasing the number of rows of the coding matrix that a client learns. Based on this, we propose the use of kk-limited-access schemes: given an index coding scheme that employs TT transmissions, we create a kk-limited-access scheme with TkTT_k\geq T transmissions, and with the property that each client learns at most kk rows of the coding matrix to decode its message. We derive upper and lower bounds on TkT_k for all values of kk, and develop deterministic designs for these schemes for which TkT_k has an order-optimal exponent for some regimes.

Keywords

Cite

@article{arxiv.1705.08437,
  title  = {Preserving Privacy while Broadcasting: $k$-Limited-Access Schemes},
  author = {Mohammed Karmoose and Linqi Song and Martina Cardone and Christina Fragouli},
  journal= {arXiv preprint arXiv:1705.08437},
  year   = {2018}
}
R2 v1 2026-06-22T19:56:53.629Z