Rank-One Boolean Tensor Factorization and the Multilinear Polytope

IF 1.4 3区数学 Q2 MATHEMATICS, APPLIED

Mathematics of Operations Research Pub Date : 2024-07-09 DOI:10.1287/moor.2022.0201

Alberto Del Pia, Aida Khajavirad

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引用次数: 0

Abstract

We consider the NP-hard problem of finding the closest rank-one binary tensor to a given binary tensor, which we refer to as the rank-one Boolean tensor factorization (BTF) problem. This optimization problem can be used to recover a planted rank-one tensor from noisy observations. We formulate rank-one BTF as the problem of minimizing a linear function over a highly structured multilinear set. Leveraging on our prior results regarding the facial structure of multilinear polytopes, we propose novel linear programming relaxations for rank-one BTF. We then establish deterministic sufficient conditions under which our proposed linear programs recover a planted rank-one tensor. To analyze the effectiveness of these deterministic conditions, we consider a semirandom model for the noisy tensor and obtain high probability recovery guarantees for the linear programs. Our theoretical results as well as numerical simulations indicate that certain facets of the multilinear polytope significantly improve the recovery properties of linear programming relaxations for rank-one BTF.Funding: A. Del Pia is partially funded by the Air Force Office of Scientific Research [Grant FA9550-23-1-0433]. A. Khajavirad is partially funded by the Air Force Office of Scientific Research [Grant FA9550-23-1-0123].

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一阶布尔张量因式分解与多线性多面体

我们考虑的是寻找与给定二进制张量最接近的秩一二进制张量的 NP 难问题，我们称之为秩一布尔张量因式分解（BTF）问题。这个优化问题可用于从噪声观测中恢复一个种植的秩一张量。我们将 rank-one BTF 问题表述为在高度结构化的多线性集合上最小化线性函数的问题。利用我们之前关于多线性多面体面结构的研究成果，我们提出了针对秩一 BTF 的新颖线性规划松弛方法。然后，我们建立了确定性充分条件，在这些充分条件下，我们提出的线性规划可以恢复一个种植的秩一张量。为了分析这些确定性条件的有效性，我们考虑了噪声张量的半随机模型，并获得了线性规划的高概率恢复保证。我们的理论结果和数值模拟表明，多线性多面体的某些面显著改善了秩一 BTF 线性编程松弛的恢复特性：A. Del Pia 的部分研究经费来自空军科学研究办公室 [拨款 FA9550-23-1-0433]。A. Khajavirad 由空军科学研究办公室[FA9550-23-1-0123 号拨款]提供部分资助。

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来源期刊

Mathematics of Operations Research 管理科学-应用数学

CiteScore

3.40

自引率

5.90%

发文量

178

审稿时长

15.0 months

期刊介绍： Mathematics of Operations Research is an international journal of the Institute for Operations Research and the Management Sciences (INFORMS). The journal invites articles concerned with the mathematical and computational foundations in the areas of continuous, discrete, and stochastic optimization; mathematical programming; dynamic programming; stochastic processes; stochastic models; simulation methodology; control and adaptation; networks; game theory; and decision theory. Also sought are contributions to learning theory and machine learning that have special relevance to decision making, operations research, and management science. The emphasis is on originality, quality, and importance; correctness alone is not sufficient. Significant developments in operations research and management science not having substantial mathematical interest should be directed to other journals such as Management Science or Operations Research.