Noisy Tensor Completion via the Sum-of-Squares Hierarchy

Noisy Tensor Completion via the Sum-of-Squares Hierarchy

Show other versions (1)

© 2016 B. Barak & A. Moitra. In the noisy tensor completion problem we observe m entries (whose location is chosen uniformly at random) from an unknown n1 × n2 × n3 tensor T. We assume that T is entry-wise close to being rank r. Our goal is to fill in its missing entries using as few observati...

Full description

Bibliographic Details
Main Authors:	Barak, Boaz, Moitra, Ankur
Other Authors:	Massachusetts Institute of Technology. Department of Mathematics
Format:	Article
Language:	English
Published:	2021
Online Access:	https://hdl.handle.net/1721.1/137985

Similar Items

Noisy tensor completion via the sum-of-squares hierarchy
by: Barak, Boaz, et al.
Published: (2022)

Dictionary Learning and Tensor Decomposition via the Sum-of-Squares Method
by: Barak, Boaz, et al.
Published: (2016)

A Nearly Tight Sum-of-Squares Lower Bound for the Planted Clique Problem
by: Barak, Boaz, et al.
Published: (2022)

Rounding sum-of-squares relaxations
by: Barak, Boaz, et al.
Published: (2015)

A Nearly Tight Sum-of-Squares Lower Bound for the Planted Clique Problem
by: Barak, Boaz, et al.
Published: (2018)

Tensor completion with noisy side information
by: Bertsimas, Dimitris, et al.
Published: (2023)

Hypercontractivity, sum-of-squares proofs, and their applications
by: Barak, Boaz, et al.
Published: (2013)

Equivariant Semidefinite Lifts and Sum-of-Squares Hierarchies
by: Fawzi, Hamza, et al.
Published: (2016)

Community detection in hypergraphs, spiked tensor models, and Sum-of-Squares
by: Kim, Chiheon, et al.
Published: (2018)

Spectral methods from tensor networks
by: Moitra, Ankur, et al.
Published: (2021)

Rank-one matrix completion is solved by the sum-of-squares relaxation of order two
by: Cosse, Augustin, et al.
Published: (2017)

Hexahedral Mesh Repair via Sum‐of‐Squares Relaxation
by: Marschner, Z, et al.
Published: (2021)

Balancing and Step Recovery Capturability via Sums-of-Squares Optimization
by: Posa, Michael Antonio, et al.
Published: (2020)

Sum-of-squares geometry processing
by: Marschner, Zoë, et al.
Published: (2022)

Fast and Accurate Tensor Completion with Total Variation Regularized Tensor Trains
by: Ko, Ching-Yun, et al.
Published: (2021)

Sum of squares generalizations for conic sets
by: Kapelevich, Lea, et al.
Published: (2022)

Compositional Verification of Large-Scale Nonlinear Systems via Sums-of-Squares Optimization
by: Shen, Shen, et al.
Published: (2021)

Compositional Verification of Large-Scale Nonlinear Systems via Sums-of-Squares Optimization
by: Shen, Shen, et al.
Published: (2021)

ADMM algorithms for matrix completion problem in noisy settings
by: Le, Tran Kien
Published: (2021)

On the sum-of-squares degree of symmetric quadratic functions
by: de Wolf, Ronald, et al.
Published: (2018)

Sampling Algebraic Varieties for Sum of Squares Programs
by: Cifuentes, Diego Fernando, et al.
Published: (2019)

Low rank decompositions for sum of squares optimization
by: Sun, Jia Li, S.M. Massachusetts Institute of Technology
Published: (2007)

Blind regression : understanding collaborative filtering from matrix completion to tensor completion
by: Li, Yihua, M. Eng. Massachusetts Institute of Technology
Published: (2016)

Achievable PID performance using sums of squares programming
by: Sendjaja, Antonius Yudi, et al.
Published: (2009)

Sum-of-Squares Collision Detection for Curved Shapes and Paths
by: Zhang, Paul, et al.
Published: (2023)

Control design along trajectories with sums of squares programming
by: Majumdar, Anirudha, et al.
Published: (2014)

Converse results on existence of sum of squares Lyapunov functions
by: Ahmadi, Amir Ali, et al.
Published: (2012)

Efficient Mean Estimation with Pure Differential Privacy via a Sum-of-Squares Exponential Mechanism
by: Hopkins, Samuel B., et al.
Published: (2022)

Certifying Unstability of Switched Systems Using Sum of Squares Programming
by: Legat, Benoît, et al.
Published: (2021)

Certifying Unstability of Switched Systems Using Sum of Squares Programming
by: Legat, Benoît, et al.
Published: (2022)

Continuous Tensor Train-Based Dynamic Programming for High-Dimensional Zero-Sum Differential Games
by: Tal, Ezra, et al.
Published: (2021)

G Scattered Data Interpolation with Minimized Sum of Squares of Principal Curvatures
by: Saaban, A., et al.
Published: (2005)

Sparse sums of squares on finite abelian groups and improved semidefinite lifts
by: Fawzi, Hamza, et al.
Published: (2016)

Moment-Sum-of-Squares Approach for Fast Risk Estimation in Uncertain Environments
by: Jasour, Ashkan M., et al.
Published: (2020)

Improved bounds for randomly sampling colorings via linear programming
by: Moitra, Ankur, et al.
Published: (2021)

G1 scattered data interpolation with minimized sum of squares of principal curvatures
by: Saaban, Azizan, et al.
Published: (2005)

Functional Scattered DataG1 Interpolation With Sum Of Squares Of Principal Curvatures.
by: Saaban, A., et al.
Published: (2005)

Sampling Quotient-Ring Sum-of-Squares Programs for Scalable Verification of Nonlinear Systems
by: Shen, Shen, et al.
Published: (2022)

A fast multiscale tomographic reconstruction method from complete but possibly noisy projection data
Published: (2003)

Tensor hierarchy and generalized Cartan calculus in SL(3) × SL(2) exceptional field theory
by: Hohm, Olaf, et al.
Published: (2015)