文摘
Camellia is a widely used block cipher, which has been selected as an international standard by ISO/IEC. In this paper, we consider a new family of differentials of round-reduced Camellia-128 depending on different key subsets. There are totally 224 key subsets corresponding to 224 types of 8-round differentials, which cover a fraction of \(1-1/2^{15}\) of the keyspace. And each type of 8-round differential consists of \(2^{43}\) differentials. Combining with the multiple differential attack techniques, we give the key-dependent multiple differential attack on 10-round Camellia-128 with data complexity \(2^{91}\) and time complexity \(2^{113}\) . Furthermore, we propose a 7-round property for Camellia-192 and an 8-round property for Camellia-256, and then mount the meet-in-the-middle attacks on 12-round Camellia-192 and 13-round Camellia-256, with complexity of \(2^{180}\) encryptions and \(2^{232.7}\) encryptions, respectively. All these attacks start from the first round in a single key setting.