International Association
for Cryptologic Research

Assuming the hardness of LWE and the existence of IO, we construct a public-key encryption scheme that is IND-CCA secure but fails to satisfy even a weak notion of indistinguishability security with respect to selective opening attacks. Prior to our work, such a separation was known only from stronger assumptions such as differing inputs obfuscation (Hofheinz, Rao, and Wichs, PKC 2016).

Central to our separation is a new hash family, which may be of independent interest. Specifically, for any $S(k) = k^{O(1)}$, any $n(k) = k^{O(1)}$, and any $m(k) = k^{\Theta(1)}$, we construct a hash family mapping $n(k)$ bits to $m(k)$ bits that is somewhere statistically correlation intractable (SS-CI) for all relations $R_k \subseteq \{0,1\}^{n(k)} \times \{0,1\}^{m(k)}$ that are enumerable by circuits of size $S(k)$.

We give two constructions of such a hash family. Our first construction uses IO, and generically ``boosts'' any hash family that is SS-CI for the smaller class of functions that are computable by circuits of size $S(k)$. This weaker hash variant can be constructed based solely on LWE (Peikert and Shiehian, CRYPTO 2019). Our second construction is based on the existence of a circular secure FHE scheme, and follows the construction of Canetti et al. (STOC 2019).