Title: Constant-Round Multiparty Private Function Evaluation with (Quasi-)Linear Complexities
Abstract: Private function evaluation (PFE) is a special case of secure multiparty computation. In multiparty PFE, the party $$P_1$$ holds its private n-variable function $$f$$ and private input $$x_1$$ , while other parties $$P_i~(n\ge i\ge 2)$$ hold their private input $$x_i$$ . All n participants can jointly evaluate the function $$f$$ , and learn nothing from the interactions except the result $$f(x_1,...,x_n)$$ (known to a subset or all of the parties). The existing multiparty PFE protocols (e.g., Mohassel et al. at Eurocrypt’13 and Asiacrypt’14) are with round complexity $$O(g)$$ ( $$g$$ is the circuit size) which makes them extremely unpractical. In this work, we propose for the first time constant-round multiparty PFE protocols that are secure against any number of corrupted parties under the semi-honest security model. We design our first construction from oblivious evaluation of switching network (OSN) protocol (Mohassel et al. at Eurocrypt’13), which only needs 9 rounds of interaction and can achieve quasi-linear communication and computation complexities (i.e., $$O(ng\log (g))$$ ). Our second construction is based on singly homomorphic encryption, which only needs 8 rounds of interaction and can achieve linear complexities. The OSN-based construction also benefits from the design trick that it only relies on symmetric operations (which makes it really efficient in actual executions). We further optimize our constructions by half-gate technology.
Publication Year: 2023
Publication Date: 2023-01-01
Language: en
Type: book-chapter
Indexed In: ['crossref']
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