We design a linearly homomorphic encryption scheme whose security relies on the hardness of the decisional Diffie-Hellman problem. Our approach requires some special features of the underlying group. In particular, its order is unknown and it contains a subgroup in which the discrete logarithm problem is tractable. Therefore, our instantiation holds in the class group of a non maximal order of an imaginary quadratic field. Its algebraic structure makes it possible to obtain such a linearly homomorphic scheme whose message space is the whole set of integers modulo a prime p and which supports an unbounded number of additions modulo p from the ciphertexts. A notable difference with previous works is that, for the first time, the security does not depend on the hardness of the factorization of integers. As a consequence, under some conditions, the prime p can be scaled to fit the application needs.
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机译:我们设计了一种线性同性恋加密方案,其安全依赖于毁灭性差异的地狱问题的硬度。我们的方法需要基础组的一些特殊功能。特别是,其顺序未知,它包含一个子组,其中离散对数问题是易行的。因此,我们的实例化在虚拟区域的非最大顺序组中持有。其代数结构使得可以获得这种线性同态方案,其消息空间是整数的整数模型Modulo Prime P并且支持来自密文中的未绑定数量的添加模数P.与以前的作品有一个值得注意的是,这是第一次安全不依赖于整数的分解的硬度。因此,在某些条件下,可以扩展素数以适应应用需求。
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