Man-in-the-Middle Attack Resistant Secret Key Generation via Channel Randomization

Pan, Yanjun; Xu, Zhou; Li, Ming; Lazos, Loukas

doi:10.1145/3466772.3467052

Cited by 9 publications

(3 citation statements)

References 33 publications

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“…Since C i randomizes all its channels by simply reconfiguring its RA, no active or passive adversary can compromise all r j ∈ ℘ i values [30,211,237,19,154,326,236,93]. In honest settings, secrecy of the star-specific secret s i , generated by the aforementioned procedure, follows directly from the following three facts:…”

Section: Each Party Inmentioning

confidence: 99%

“…To defend against such attacks, we can apply techniques that allow us to detect an MITM attack over physical layer [303], and if one is detected, the antenna of ∂ i 's central hub, C i , can be reconfigured to randomize all channels in ∂ i [237]. This only requires a reconfigurable antenna (RA) at each central hub.…”

Section: Maximum Number Of Sskh Prfs and Defenses Against Various Att...mentioning

confidence: 99%

“…For detailed introduction to the topic and its applications in different settings, we refer the interested reader to [30,211,237,19,154,326,236,93]. In this manner, channel state randomization can be used to effectively reduce an MITM attack to the less harmful jamming attack [221].…”

Section: Maximum Number Of Sskh Prfs and Defenses Against Various Att...mentioning

confidence: 99%

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Star-specific Key-homomorphic PRFs from Linear Regression and Extremal Set Theory

Sehrawat¹,

Yeo²,

Vassilyev³

2022

Preprint

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We introduce a novel method to derandomize the learning with errors (LWE) problem by generating deterministic yet sufficiently independent LWE instances, that are constructed via special linear regression models. 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., some pair of sets 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 t-intersecting k-uniform family of sets H, where the three properties are defined as:For the same purpose, we define and compute the mutual information between different linear regression hypotheses that are generated via overlapping training datasets.

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