Matrix scaling and matrix balancing are two basic linear-algebraic problems with a wide variety of applications, such as approximating the permanent, and pre-conditioning linear systems to make them more numerically stable. We study the power and limitations of quantum algorithms for these problems. We provide quantum implementations of two classical (in both senses of the word) methods: Sinkhorn's algorithm for matrix scaling and Osborne's algorithm for matrix balancing. Using amplitude estimation as our main tool, our quantum implementations both run in time Õ(√mn/∈4) for scaling or balancing an n×n matrix (given by an oracle) with m non-zero entries to within ℓ1-error ∈. Their classical analogs use time Õ(m/∈2), and every classical algor...
We study quantum algorithms that learn properties of a matrix using queries that return its action o...
An n-qubit quantum circuit performs a unitary operation on an exponentially large, 2n-dimensional, H...
We describe a quantum algorithm for finding the smallest eigenvalue of a Hermitian matrix. This algo...
Matrix scaling and matrix balancing are two basic linear-algebraic problems with a wide variety of a...
Matrix scaling is a simple to state, yet widely applicable linear-algebraic problem: the goal is to ...
Brand\xc3\xa3o and Svore [BS17] recently gave quantum algorithms for approximately solving semidefin...
The theories of optimization and machine learning answer foundational questions in computer science ...
We give two new quantum algorithms for solving semidefinite programs (SDPs) providing quantum speed-...
Brandão and Svore very recently gave quantum algorithms for approximately solving semidefinite progr...
Quantum amplitude amplification is a method of increasing a success probability of an algorithm from...
We give two quantum algorithms for solving semidefinite programs (SDPs) providing quantum speed-ups....
We give a classical algorithm for linear regression analogous to the quantum matrix inversion algori...
Most quantum algorithms offering speedups over classical algorithms are based on the three technique...
The theories of optimization and machine learning answer foundational questions in computer science ...
Quantum control plays a key role in quantum technology, in particular for steer-ing quantum systems....
We study quantum algorithms that learn properties of a matrix using queries that return its action o...
An n-qubit quantum circuit performs a unitary operation on an exponentially large, 2n-dimensional, H...
We describe a quantum algorithm for finding the smallest eigenvalue of a Hermitian matrix. This algo...
Matrix scaling and matrix balancing are two basic linear-algebraic problems with a wide variety of a...
Matrix scaling is a simple to state, yet widely applicable linear-algebraic problem: the goal is to ...
Brand\xc3\xa3o and Svore [BS17] recently gave quantum algorithms for approximately solving semidefin...
The theories of optimization and machine learning answer foundational questions in computer science ...
We give two new quantum algorithms for solving semidefinite programs (SDPs) providing quantum speed-...
Brandão and Svore very recently gave quantum algorithms for approximately solving semidefinite progr...
Quantum amplitude amplification is a method of increasing a success probability of an algorithm from...
We give two quantum algorithms for solving semidefinite programs (SDPs) providing quantum speed-ups....
We give a classical algorithm for linear regression analogous to the quantum matrix inversion algori...
Most quantum algorithms offering speedups over classical algorithms are based on the three technique...
The theories of optimization and machine learning answer foundational questions in computer science ...
Quantum control plays a key role in quantum technology, in particular for steer-ing quantum systems....
We study quantum algorithms that learn properties of a matrix using queries that return its action o...
An n-qubit quantum circuit performs a unitary operation on an exponentially large, 2n-dimensional, H...
We describe a quantum algorithm for finding the smallest eigenvalue of a Hermitian matrix. This algo...