Friday, November 29, 2019

2.1.2 Diffusion and Confusion

Claude Shannon, in his seminal article on the mathematics of cryptography, defined two concepts he called diffusion and confusion.  In diffusion, information from the original plaintext message is spread across more than one symbol in the output ciphertext; the farther the information spreads, the better.  Shannon defined confusion as making "the relation between...[the ciphertext] $E$ and the...[key] $K$ a very complex and involved one."

Feistel, who designed DES, called diffusion the avalanche effect. Webster and Tavares defined the strict avalanche criterion (SAC), requiring that changing a single input bit flips each of the output bits with 50% probability.

The Handbook of Applied Cryptography says the following (p. 20 in my edition):
A substitution in a round is said to add confusion to the encryption process whereas a transposition [permutation] is said to add diffusion. Confusion is intended to make the relationship between the key and the ciphertext as complex as possible.  Diffusion refers to rearranging or spreading out the bits in the message so that any redundancy in the plaintext is spread out over the ciphertext.
I haven't seen it written quite this directly (but then, I'm not that well read in crypto), but I think it's fair to say that confusion is achieved by the nonlinearity of the S-boxes.

These two concepts don't seem to figure prominently in the cryptography books and papers I have been reading, but it seems to me that they ultimately underly much of the process of cryptanalysis: spreading data broadly reduces the relationship exhibited by two ciphertexts even when the plaintexts are closely related, expanding the search space; and the nonlinearity means that even a large set of straightforward equations is not enough to simply and mathematicallyrelate the input and output.

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