English

Star-specific Key-homomorphic PRFs from Learning with Linear Regression

Cryptography and Security 2023-07-31 v3 Information Theory Combinatorics math.IT

Abstract

We introduce a novel method to derandomize the learning with errors (LWE) problem by generating deterministic yet sufficiently independent LWE instances that are constructed by using linear regression models, which are generated via (wireless) communication errors. We also introduce star-specific key-homomorphic (SSKH) pseudorandom functions (PRFs), which are defined by the respective sets of parties that construct them. We use our derandomized variant of LWE to construct a SSKH PRF family. The sets of parties constructing SSKH PRFs are arranged as star graphs with possibly shared vertices, i.e., the pairs of sets may have non-empty intersections. We reduce the security of our SSKH PRF family to the hardness of LWE. To establish the maximum number of SSKH PRFs that can be constructed -- by a set of parties -- in the presence of passive/active and external/internal adversaries, we prove several bounds on the size of maximally cover-free at most tt-intersecting kk-uniform family of sets H\mathcal{H}, where the three properties are defined as: (i) kk-uniform: AH:A=k\forall A \in \mathcal{H}: |A| = k, (ii) at most tt-intersecting: A,BH,BA:ABt\forall A, B \in \mathcal{H}, B \neq A: |A \cap B| \leq t, (iii) maximally cover-free: AH:A⊈BHBAB\forall A \in \mathcal{H}: A \not\subseteq \bigcup\limits_{\substack{B \in \mathcal{H} \\ B \neq A}} B. For the same purpose, we define and compute the mutual information between different linear regression hypotheses that are generated from overlapping training datasets.

Cite

@article{arxiv.2205.00861,
  title  = {Star-specific Key-homomorphic PRFs from Learning with Linear Regression},
  author = {Vipin Singh Sehrawat and Foo Yee Yeo and Dmitriy Vassilyev},
  journal= {arXiv preprint arXiv:2205.00861},
  year   = {2023}
}

Comments

This is the preprint of a paper published in IEEE Access, vol. 11, pp. 73235-73267, 2023

R2 v1 2026-06-24T11:04:41.527Z