Some Notes on the Sample Complexity of Approximate Channel Simulation

Abstract

Channel simulation algorithms can efficiently encode random samples from a prescribed target distribution Q and find applications in machine learning-based lossy data compression. However, algorithms that encode exact samples usually have random runtime, limiting their applicability when a consistent encoding time is desirable. Thus, this paper considers approximate schemes with a fixed runtime instead. First, we strengthen a result of Agustsson and Theis and show that there is a class of pairs of target distribution Q and coding distribution P, for which the runtime of any approximate scheme scales at least super-polynomially in D∞[Q P]. We then show, by contrast, that if we have access to an unnormalised Radon-Nikodym derivative r dQ/dP and knowledge of DKL[Q P], we can exploit global-bound, depth-limited A* coding to ensure TV[Q P] ≤ ε and maintain optimal coding performance with a sample complexity of only 2((DKL[Q P] + o(1)) / ε).

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