English

Pliable Private Information Retrieval

Information Theory 2022-06-14 v1 Information Retrieval math.IT

Abstract

We formulate a new variant of the private information retrieval (PIR) problem where the user is pliable, i.e., interested in any message from a desired subset of the available dataset, denoted as pliable private information retrieval (PPIR). We consider a setup where a dataset consisting of ff messages is replicated in nn noncolluding databases and classified into Γ\Gamma classes. For this setup, the user wishes to retrieve any λ1\lambda\geq 1 messages from multiple desired classes, i.e., η1\eta\geq 1, while revealing no information about the identity of the desired classes to the databases. We term this problem multi-message PPIR (M-PPIR) and introduce the single-message PPIR (PPIR) problem as an elementary special case of M-PPIR. We first derive converse bounds on the M-PPIR rate, which is defined as the ratio of the desired amount of information and the total amount of downloaded information, followed by the corresponding achievable schemes. As a result, we show that the PPIR capacity, i.e., the maximum achievable PPIR rate, for nn noncolluding databases matches the capacity of PIR with nn databases and Γ\Gamma messages. Thus, enabling flexibility, i.e., pliability, where privacy is only guaranteed for classes, but not for messages as in classical PIR, allows to trade-off privacy versus download rate. A similar insight is shown to hold for the general case of M-PPIR.

Keywords

Cite

@article{arxiv.2206.05759,
  title  = {Pliable Private Information Retrieval},
  author = {Sarah A. Obead and Jörg Kliewer},
  journal= {arXiv preprint arXiv:2206.05759},
  year   = {2022}
}

Comments

23 pages, 3 figures, 3 tables, submitted for possible publication

R2 v1 2026-06-24T11:47:59.671Z