Add to ORKGWe present a novel algorithm, Random Conic Pursuit, that solves semidefinite pro-grams (SDPs) via repeated optimization over randomly selected two-dimensional subcones of the PSD cone. This scheme is simple, easily implemented, applica-ble to very general SDPs, scalable, and theoretically interesting. Its advantages are realized at the expense of an ability to readily compute highly exact solutions, though useful approximate solutions are easily obtained. This property renders Random Conic Pursuit of particular interest for machine learning applications, in which the relevant SDPs are generally based upon random data and so exact min-ima are often not a priority. Indeed, we present empirical results to this effect for various SDPs encounter...
We present a modified version of the perceptron learning algorithm (PLA) which solves semidefinite p...
We consider unconstrained randomized optimization of smooth convex functions in the gradient-free se...
Final version, to appear in Stochastic SystemsInternational audienceWe derive a stochastic gradient ...
Random projections can reduce the dimensionality of point sets while keeping approximate congruence....
Many existing procedures in machine learning and statistics are computationally intractable in the s...
International audienceRandom projections can reduce the dimensionality of point sets while keeping a...
International audienceWe discuss the application of random projections to conic programming: notably...
Several important machine learning problems can be modeled and solved via semidefinite programs. Oft...
Many important machine learning problems are modeled and solved via semidefinite programs; examples ...
Linear programming (LP) problems are commonly used in analysis and resource allocation, frequently s...
Random projection is a simple geometric technique for reducing the dimensionality of a set of points...
Many important machine learning problems are modeled and solved via semidefinite programs; examples ...
Linear programming (LP) problems are commonly used in analysis and resource allocation, frequently s...
We propose a random-subspace algorithmic framework for global optimization of Lipschitz-continuous o...
We derive a stochastic gradient algorithm for semidefinite optimization using randomization techniqu...
We present a modified version of the perceptron learning algorithm (PLA) which solves semidefinite p...
We consider unconstrained randomized optimization of smooth convex functions in the gradient-free se...
Final version, to appear in Stochastic SystemsInternational audienceWe derive a stochastic gradient ...
Random projections can reduce the dimensionality of point sets while keeping approximate congruence....
Many existing procedures in machine learning and statistics are computationally intractable in the s...
International audienceRandom projections can reduce the dimensionality of point sets while keeping a...
International audienceWe discuss the application of random projections to conic programming: notably...
Several important machine learning problems can be modeled and solved via semidefinite programs. Oft...
Many important machine learning problems are modeled and solved via semidefinite programs; examples ...
Linear programming (LP) problems are commonly used in analysis and resource allocation, frequently s...
Random projection is a simple geometric technique for reducing the dimensionality of a set of points...
Many important machine learning problems are modeled and solved via semidefinite programs; examples ...
Linear programming (LP) problems are commonly used in analysis and resource allocation, frequently s...
We propose a random-subspace algorithmic framework for global optimization of Lipschitz-continuous o...
We derive a stochastic gradient algorithm for semidefinite optimization using randomization techniqu...
We present a modified version of the perceptron learning algorithm (PLA) which solves semidefinite p...
We consider unconstrained randomized optimization of smooth convex functions in the gradient-free se...
Final version, to appear in Stochastic SystemsInternational audienceWe derive a stochastic gradient ...