Improved Graph Laplacian via Geometric Consistency

被引：0

作者：

Perrault-Joncas, Dominique C. ^{[1
]}

Meila, Marina ^{[2
]}

McQueen, James ^{[3
]}

机构：

[1] Google Inc, Mountain View, CA 94043 USA

[2] Univ Washington, Dept Stat, Seattle, WA 98195 USA

[3] Amazon, Seattle, WA USA

来源：

ADVANCES IN NEURAL INFORMATION PROCESSING SYSTEMS 30 (NIPS 2017) | 2017年 / 30卷

关键词：

CONVERGENCE; REDUCTION;

D O I：

暂无

中图分类号：

TP18 [人工智能理论];

学科分类号：

081104 ; 0812 ; 0835 ; 1405 ;

摘要：

In all manifold learning algorithms and tasks setting the kernel bandwidth epsilon used construct the graph Laplacian is critical. We address this problem by choosing a quality criterion for the Laplacian, that measures its ability to preserve the geometry of the data. For this, we exploit the connection between manifold geometry, represented by the Riemannian metric, and the Laplace-Beltrami operator. Experiments show that this principled approach is effective and robust.

引用

页数：10

共 50 条

[1] Geometric structure of graph Laplacian embeddings
Trillos, Nicolas Garcia
Hoffmann, Franca
Hosseini, Bamdad
[J]. JOURNAL OF MACHINE LEARNING RESEARCH, 2021, 22
[2] Geometric structure of graph Laplacian embeddings
Trillos, Nicolás García
Hoffmann, Franca
Hosseini, Bamdad
[J]. Journal of Machine Learning Research, 2021, 22
[3] Preserving consistency in geometric modeling with graph transformations
Arnould, Agnes
Belhaouari, Hakim
Bellet, Thomas
Le Gall, Pascale
Pascual, Romain
[J]. MATHEMATICAL STRUCTURES IN COMPUTER SCIENCE, 2022, 32 (03) : 300 - 347
[4] Bayesian Regularization via Graph Laplacian
Liu, Fei
Chakraborty, Sounak
Li, Fan
Liu, Yan
Lozano, Aurelie C.
[J]. BAYESIAN ANALYSIS, 2014, 9 (02): : 449 - 474
[5] An improved upper bound for Laplacian graph eigenvalues
Das, KC
[J]. LINEAR ALGEBRA AND ITS APPLICATIONS, 2003, 368 : 269 - 278
[6] Visual Image Search Improved with Geometric Consistency
Ozkan, Savas
Esen, Ersin
Akar, Gozde Bozdagi
[J]. 2013 21ST SIGNAL PROCESSING AND COMMUNICATIONS APPLICATIONS CONFERENCE (SIU), 2013,
[7] Tracking Evolving Geometric Data by Local Graph Laplacian Operators
Chang, Hsun-Hsien Shane
[J]. 2022 IEEE WESTERN NEW YORK IMAGE AND SIGNAL PROCESSING WORKSHOP (WNYISPW), 2022,
[8] A Geometric Property of the Laplacian matrix of a Connected Nonsingular Mixed Graph
Zhou, Zheng-Da
Gong, Shi-Cai
[J]. JOURNAL OF CHEMISTRY, 2020, 2020
[9] Improved Upper Bounds for the Laplacian Spectral Radius of a Graph
Wang, Tianfei
Yang, Jin
Li, Bin
[J]. ELECTRONIC JOURNAL OF COMBINATORICS, 2011, 18 (01):
[10] Color-guided Depth Map Super-Resolution via Joint Graph Laplacian and Gradient Consistency Regularization
Chen, Rong
Zhai, Deming
Liu, Xianming
Zhao, Debin
[J]. 2018 IEEE 20TH INTERNATIONAL WORKSHOP ON MULTIMEDIA SIGNAL PROCESSING (MMSP), 2018,

← 1 2 3 4 5 →