The Vernam cipher is robust to small deviations from randomness

TL;DR

This paper investigates the secrecy of the Vernam cipher when the key is generated by a Bernoulli source with a small bias, demonstrating its robustness to slight deviations from perfect randomness.

Contribution

It provides theoretical estimates for the secrecy of stationary ergodic source-based ciphers, extending understanding beyond ideal random keys.

Findings

Vernam cipher remains robust with small bias in key generation.

Theoretical bounds for secrecy with stationary ergodic processes.

Analysis applicable to real-world imperfect randomness scenarios.

Abstract

The Vernam cipher (or one-time pad) has played an important rule in cryptography because it is a perfect secrecy system. For example, if an English text (presented in binary system) $X_1 X_2 ... $ is enciphered according to the formula $Z_i = (X_i + Y_i) \mod 2 $, where $Y_1 Y_2 ...$ is a key sequence generated by the Bernoulli source with equal probabilities of 0 and 1, anyone who knows $Z_1 Z_2 ... $ has no information about $X_1 X_2 ... $ without the knowledge of the key $Y_1 Y_2 ...$. (The best strategy is to guess $X_1 X_2 ... $ not paying attention to $Z_1 Z_2 ... $.) But what should one say about secrecy of an analogous method where the key sequence $Y_1 Y_2 ...$ is generated by the Bernoulli source with a small bias, say, $P(0) = 0.49, $ $ P(1) = 0.51$? To the best of our knowledge, there are no theoretical estimates for the secrecy of such a system, as well as for the general case where $X_1 X_2 ... $ (the plaintext) and key sequence are described by stationary ergodic processes. We consider the running-key ciphers where the plaintext and the key are generated by stationary ergodic sources and show how to estimate the secrecy of such systems. In particular, it is shown that, in a certain sense, the Vernam cipher is robust to small deviations from randomness.