Mathematics (Oct 2020)

Compiled Constructions towards Post-Quantum Group Key Exchange: A Design from <tt>Kyber</tt>

  • José Ignacio Escribano Pablos,
  • María Isabel González Vasco,
  • Misael Enrique Marriaga,
  • Ángel Luis Pérez del Pozo

DOI
https://doi.org/10.3390/math8101853
Journal volume & issue
Vol. 8, no. 10
p. 1853

Abstract

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A group authenticated key exchange (GAKE) protocol allows a set of parties belonging to a certain designated group to agree upon a common secret key through an insecure communication network. In the last few years, many new cryptographic tools have been specifically designed to thwart attacks from adversaries which may have access to (different kinds of) quantum computation resources. However, few constructions for group key exchange have been put forward. Here, we propose a four-round GAKE which can be proven secure under widely accepted assumptions in the Quantum Random Oracle Model. Specifically, we integrate several primitives from the so-called Kyber suite of post-quantum tools in a (slightly modified) compiler from Abdalla et al. (TCC 2007). More precisely, taking as a starting point an IND-CPA encryption scheme from the Kyber portfolio, we derive, using results from Hövelmanns et al. (PKC 2020), a two-party key exchange protocol and an IND-CCA encryption scheme and prove them fit as building blocks for our compiled construction. The resulting GAKE protocol is secure under the Module-LWE assumption, and furthermore achieves authentication without the use of (expensive) post-quantum signatures.

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