Author Info
Name
Affiliation
Papers
RICHARD Y. ZHANG
Dept. of Electr. Eng. & Comput. Sci., Massachusetts Inst. of Technol., Cambridge, MA, USA
20
Collaborators
Citations 
PageRank 
12
10
6.92
Referers 
Referees 
References 
12
278
215
Search Limit
100278
Title
Citations
PageRank
Year
Uniqueness of Power Flow Solutions Using Monotonicity and Network Topology10.362021
Large-Scale Traffic Signal Offset Optimization00.342020
On the Tightness of Semidefinite Relaxations for Certifying Robustness to Adversarial Examples00.342020
Sharp Restricted Isometry Bounds for the Inexistence of Spurious Local Minima in Nonconvex Matrix Recovery.00.342019
Monotonicity Between Phase Angles And Power Flow And Its Implications For The Uniqueness Of Solutions00.342019
Conic optimization for control, energy systems, and machine learning: Applications and algorithms00.342019
Spurious Local Minima in Power System State Estimation00.342019
Sparse Inverse Covariance Estimation For Chordal Structures20.412018
Conic Optimization Theory: Convexification Techniques And Numerical Algorithms00.342018
A theory on the absence of spurious solutions for nonconvex and nonsmooth optimization.20.362018
Conic Approximation with Provable Guarantee for Traffic Signal Offset Optimization00.342018
GMRES-Accelerated ADMM for Quadratic Objectives00.342018
Linear-Time Algorithm for Learning Large-Scale Sparse Graphical Models.00.342018
Large-Scale Sparse Inverse Covariance Estimation via Thresholding and Max-Det Matrix Completion.10.352018
Sparse Semidefinite Programs With Near-Linear Time Complexity00.342018
How Much Restricted Isometry is Needed In Nonconvex Matrix Recovery?20.362018
Efficient Algorithm For Large-And-Sparse Lmi Feasibility Problems00.342018
Spurious Critical Points In Power System State Estimation10.352018
Modified Interior-Point Method For Large-And-Sparse Low-Rank Semidefinite Programs10.342017
Toeplitz-Plus-Hankel Matrix Recovery for Green’s Function Computations on General Substrates00.342015