English

Distributed Source Simulation With No Communication

Information Theory 2019-06-18 v1 math.IT

Abstract

We consider the problem of distributed source simulation with no communication, in which Alice and Bob observe sequences UnU^n and VnV^n respectively, drawn from a joint distribution pUVnp_{UV}^{\otimes n}, and wish to locally generate sequences XnX^n and YnY^n respectively with a joint distribution that is close (in KL divergence) to pXYnp_{XY}^{\otimes n}. We provide a single-letter condition under which such a simulation is asymptotically possible with a vanishing KL divergence. Our condition is nontrivial only in the case where the G\`acs-K\"orner (GK) common information between UU and VV is nonzero, and we conjecture that only scalar Markov chains XUVYX-U-V-Y can be simulated otherwise. Motivated by this conjecture, we further examine the case where both pUVp_{UV} and pXYp_{XY} are doubly symmetric binary sources with parameters p,q1/2p,q\leq 1/2 respectively. While it is trivial that in this case pqp\leq q is both necessary and sufficient, we show that when pp is close to qq then any successful simulation is close to being scalar in the total variation sense.

Cite

@article{arxiv.1906.06970,
  title  = {Distributed Source Simulation With No Communication},
  author = {Tomer Berg and Ofer Shayevitz and Young-Han Kim and Lele Wang},
  journal= {arXiv preprint arXiv:1906.06970},
  year   = {2019}
}
R2 v1 2026-06-23T09:55:29.929Z