Related papers: On the Fundamental Limits of Exact Inference in Structured Prediction

On the Fundamental Limits of Exact Inference in Structured Prediction

URL: http://arxiv.org/abs/2102.08895v1
Date: Wed, 17 Feb 2021 17:44:21 GMT
Title: On the Fundamental Limits of Exact Inference in Structured Prediction
Authors: Hanbyul Lee and Kevin Bello and Jean Honorio
Abstract summary: Inference is a main task in structured prediction and it is naturally modeled with a graph. The goal of exact inference is to recover the unknown true label for each node precisely. We show that there exists a gap between the fundamental limits and the performance of the computationally tractable method of Bello and Honorio.
Score: 34.978150480870696
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Inference is a main task in structured prediction and it is naturally modeled with a graph. In the context of Markov random fields, noisy observations corresponding to nodes and edges are usually involved, and the goal of exact inference is to recover the unknown true label for each node precisely. The focus of this paper is on the fundamental limits of exact recovery irrespective of computational efficiency, assuming the generative process proposed by Globerson et al. (2015). We derive the necessary condition for any algorithm and the sufficient condition for maximum likelihood estimation to achieve exact recovery with high probability, and reveal that the sufficient and necessary conditions are tight up to a logarithmic factor for a wide range of graphs. Finally, we show that there exists a gap between the fundamental limits and the performance of the computationally tractable method of Bello and Honorio (2019), which implies the need for further development of algorithms for exact inference.

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