Approximating the total variation distance between spin systems

February 08, 2025 Β· Declared Dead Β· πŸ› Annual Conference Computational Learning Theory

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Authors Weiming Feng, Hongyang Liu, Minji Yang arXiv ID 2502.05437 Category cs.DS: Data Structures & Algorithms Cross-listed cs.LG, math.PR Citations 1 Venue Annual Conference Computational Learning Theory Last Checked 4 months ago
Abstract
Spin systems form an important class of undirected graphical models. For two Gibbs distributions $ΞΌ$ and $Ξ½$ induced by two spin systems on the same graph $G = (V, E)$, we study the problem of approximating the total variation distance $d_{TV}(ΞΌ,Ξ½)$ with an $Ξ΅$-relative error. We propose a new reduction that connects the problem of approximating the TV-distance to sampling and approximate counting. Our applications include the hardcore model and the antiferromagnetic Ising model in the uniqueness regime, the ferromagnetic Ising model, and the general Ising model satisfying the spectral condition. Additionally, we explore the computational complexity of approximating the total variation distance $d_{TV}(ΞΌ_S,Ξ½_S)$ between two marginal distributions on an arbitrary subset $S \subseteq V$. We prove that this problem remains hard even when both $ΞΌ$ and $Ξ½$ admit polynomial-time sampling and approximate counting algorithms.
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