The angular synchronization problem of estimating a set of unknown angles from their known noisy pairwise differences arises in various applications. It can be reformulated as an optimization problem on graphs involving the graph Laplacian matrix. We consider a general, weighted version of this problem, where the impact of the noise differs between different pairs of entries and some of the differences are erased completely; this version arises for example in ptychography. We study two common approaches for solving this problem, namely eigenvector relaxation and semidefinite convex relaxation. Although some recovery guarantees are available for both methods, their performance is either unsatisfying or restricted to the unweighted graphs. We...
Suppose we wish to recover a signal x ∈ Cn from m intensity measurements of the form |〈x, zi〉|2, i =...
ABSTRACT. We study convex relaxation algorithms for phase retrieval on imaging problems. We show tha...
Many problems can be characterized by the task of recovering the low-rank and sparse components of a...
AbstractThe angular synchronization problem is to obtain an accurate estimation (up to a constant ad...
Abstract. The synchronization problem over the special orthogonal group SO(d) consists of estimating...
Many maximum likelihood estimation problems are, in general, intractable optimization problems. As a...
Many maximum likelihood estimation problems are known to be intractable in the worst case. A common ...
Given an undirected measurement graph G = ([n],E), the classical angular synchronization problem con...
This note formulates a deterministic recovery result for vectors x from quadratic measure-ments of t...
In this paper we survey and put in a common framework several works that have been developed in diff...
We consider the problem of signal recovery on graphs. Graphs model data with complex structure assig...
University of Minnesota Ph.D. dissertation. August 2020. Major: Mathematics. Advisor: Gilad Lerman. ...
This paper addresses the problem of synchronizing orthogonal matrices over directed graphs. For sync...
In this work we analyze the problem of phase retrieval from Fourier measurements with random diffrac...
Signal recovery from the amplitudes of the Fourier transform, or equivalently from the autocorrelati...
Suppose we wish to recover a signal x ∈ Cn from m intensity measurements of the form |〈x, zi〉|2, i =...
ABSTRACT. We study convex relaxation algorithms for phase retrieval on imaging problems. We show tha...
Many problems can be characterized by the task of recovering the low-rank and sparse components of a...
AbstractThe angular synchronization problem is to obtain an accurate estimation (up to a constant ad...
Abstract. The synchronization problem over the special orthogonal group SO(d) consists of estimating...
Many maximum likelihood estimation problems are, in general, intractable optimization problems. As a...
Many maximum likelihood estimation problems are known to be intractable in the worst case. A common ...
Given an undirected measurement graph G = ([n],E), the classical angular synchronization problem con...
This note formulates a deterministic recovery result for vectors x from quadratic measure-ments of t...
In this paper we survey and put in a common framework several works that have been developed in diff...
We consider the problem of signal recovery on graphs. Graphs model data with complex structure assig...
University of Minnesota Ph.D. dissertation. August 2020. Major: Mathematics. Advisor: Gilad Lerman. ...
This paper addresses the problem of synchronizing orthogonal matrices over directed graphs. For sync...
In this work we analyze the problem of phase retrieval from Fourier measurements with random diffrac...
Signal recovery from the amplitudes of the Fourier transform, or equivalently from the autocorrelati...
Suppose we wish to recover a signal x ∈ Cn from m intensity measurements of the form |〈x, zi〉|2, i =...
ABSTRACT. We study convex relaxation algorithms for phase retrieval on imaging problems. We show tha...
Many problems can be characterized by the task of recovering the low-rank and sparse components of a...