A Cryptography Inspired Model for Non-local Correlations: Decrypting the Enigmas

We propose a cryptography-inspired model for nonlocal correlations. Following the celebrated De Broglie-Bohm theory, we model nonlocal boxes as realistic systems with instantaneous signalling at the hidden variable level. By introducing randomness in the distribution of the hidden variable, the superluminal signalling model is made compatible with the operational no-signalling condition. As the design mimics the famous symmetric key encryption system called {\it One Time Pads} (OTP), we call this the OTP model for nonlocal boxes. We demonstrate utility of this model in several esoteric examples related to the nonclassicality of nonlocal boxes. In particular, the breakdown of communication complexity using nonlocal boxes can be better understood in this framework. Furthermore, we discuss the Van Dam protocol and show its connection to homomorphic encryption in cryptography. We also discuss possible ways of encapsulating quantum realizable nonlocal correlations within this framework and show that the principle of Information Causality imposes further constraints at the hidden variable level. Present work thus orchestrates the results in classical cryptography to improve our understanding of nonlocal correlations and welcomes further research to this connection.