Lasso and Ridge are important minimization problems in machine learning and statistics. They are versions of linear regression with squared loss where the vector $\theta\in\mathbb{R}^d$ of coefficients is constrained in either $\ell_1$-norm (for Lasso) or in $\ell_2$-norm (for Ridge). We study the complexity of quantum algorithms for finding $\varepsilon$-minimizers for these minimization problems. We show that for Lasso we can get a quadratic quantum speedup in terms of $d$ by speeding up the cost-per-iteration of the Frank-Wolfe algorithm, while for Ridge the best quantum algorithms are linear in $d$, as are the best classical algorithms. As a byproduct of our quantum lower bound for Lasso, we also prove the first classical lower bound fo...
We introduce a new quantum optimization algorithm for dense linear programming problems, which can b...
Most quantum algorithms offering speedups over classical algorithms are based on the three technique...
We create a variety of new quantum algorithms that use Grover's algorithm and similar techniques to ...
Lasso and Ridge are important minimization problems in machine learning and statistics. They are ver...
Lasso and Ridge are important minimization problems in machine learning and statistics. They are ver...
We create classical (non-quantum) dynamic data structures supporting queries for recommender systems...
Dequantized algorithms show that quantum computers do not have exponential speedups for many linear ...
Brand\xc3\xa3o and Svore [BS17] recently gave quantum algorithms for approximately solving semidefin...
We give a classical algorithm for linear regression analogous to the quantum matrix inversion algori...
We describe a quantum algorithm for finding the smallest eigenvalue of a Hermitian matrix. This algo...
Brandão and Svore very recently gave quantum algorithms for approximately solving semidefinite progr...
Least squares regression is the simplest and most widely used technique for solving overde-termined ...
The theories of optimization and machine learning answer foundational questions in computer science ...
The eligibility of various advanced quantum algorithms will be questioned if they can not guarantee ...
We consider the power of local algorithms for approximately solving Max $k$XOR, a generalization of ...
We introduce a new quantum optimization algorithm for dense linear programming problems, which can b...
Most quantum algorithms offering speedups over classical algorithms are based on the three technique...
We create a variety of new quantum algorithms that use Grover's algorithm and similar techniques to ...
Lasso and Ridge are important minimization problems in machine learning and statistics. They are ver...
Lasso and Ridge are important minimization problems in machine learning and statistics. They are ver...
We create classical (non-quantum) dynamic data structures supporting queries for recommender systems...
Dequantized algorithms show that quantum computers do not have exponential speedups for many linear ...
Brand\xc3\xa3o and Svore [BS17] recently gave quantum algorithms for approximately solving semidefin...
We give a classical algorithm for linear regression analogous to the quantum matrix inversion algori...
We describe a quantum algorithm for finding the smallest eigenvalue of a Hermitian matrix. This algo...
Brandão and Svore very recently gave quantum algorithms for approximately solving semidefinite progr...
Least squares regression is the simplest and most widely used technique for solving overde-termined ...
The theories of optimization and machine learning answer foundational questions in computer science ...
The eligibility of various advanced quantum algorithms will be questioned if they can not guarantee ...
We consider the power of local algorithms for approximately solving Max $k$XOR, a generalization of ...
We introduce a new quantum optimization algorithm for dense linear programming problems, which can b...
Most quantum algorithms offering speedups over classical algorithms are based on the three technique...
We create a variety of new quantum algorithms that use Grover's algorithm and similar techniques to ...