In this expository article, we study optimization problems specified via linear and relative entropy inequalities. Such relative entropy programs (REPs) are convex optimization problems as the relative entropy function is jointly convex with respect to both its arguments. Prominent families of convex programs such as geometric programs (GPs), second-order cone programs, and entropy maximization problems are special cases of REPs, although REPs are more general than these classes of problems. We provide solutions based on REPs to a range of problems such as permanent maximization, robust optimization formulations of GPs, and hitting-time estimation in dynamical systems. We survey previous approaches to some of these problems and the limitati...
Minimization problems with respect to a one-parameter family of generalized relative entropies are s...
The joint convexity of the map $(X,A) \mapsto X^* A^{-1} X$, an integral representation of operator ...
Distance measures between quantum states like the trace distance and the fidelity can naturally be d...
In this expository article, we study optimization problems specified via linear and relative entropy...
This paper shows the equivalence of entropy-maximization models to geometric programs. As a result w...
We propose a general framework for solving quantum state estimation problems using the minimum relat...
In this dissertation we consider quantum algorithms for convex optimization. We start by considering...
We study minimization problems with respect to a one-parameter family of generalized relative entrop...
The paper presents an analysis of the constrained entropy maximization model from the point of view ...
AbstractIn this paper, we study the minimum cross-entropy optimization problem subject to a general ...
We consider the general problem of relative entropy minimization and entropy maximiza-tion subject t...
This dissertation describes the progress made towards understanding several quantum entropies and th...
We introduce and study conic geometric programs (CGPs), which are convex optimiza-tion problems that...
We develop a semidefinite programming method for the optimization of quantum networks, including bot...
The theories of optimization and machine learning answer foundational questions in computer science ...
Minimization problems with respect to a one-parameter family of generalized relative entropies are s...
The joint convexity of the map $(X,A) \mapsto X^* A^{-1} X$, an integral representation of operator ...
Distance measures between quantum states like the trace distance and the fidelity can naturally be d...
In this expository article, we study optimization problems specified via linear and relative entropy...
This paper shows the equivalence of entropy-maximization models to geometric programs. As a result w...
We propose a general framework for solving quantum state estimation problems using the minimum relat...
In this dissertation we consider quantum algorithms for convex optimization. We start by considering...
We study minimization problems with respect to a one-parameter family of generalized relative entrop...
The paper presents an analysis of the constrained entropy maximization model from the point of view ...
AbstractIn this paper, we study the minimum cross-entropy optimization problem subject to a general ...
We consider the general problem of relative entropy minimization and entropy maximiza-tion subject t...
This dissertation describes the progress made towards understanding several quantum entropies and th...
We introduce and study conic geometric programs (CGPs), which are convex optimiza-tion problems that...
We develop a semidefinite programming method for the optimization of quantum networks, including bot...
The theories of optimization and machine learning answer foundational questions in computer science ...
Minimization problems with respect to a one-parameter family of generalized relative entropies are s...
The joint convexity of the map $(X,A) \mapsto X^* A^{-1} X$, an integral representation of operator ...
Distance measures between quantum states like the trace distance and the fidelity can naturally be d...