Proves eventual linear convergence for exchange and continuous methods in total variation minimization over measures under regularity conditions.
Sparse Inverse Problems Over Measures: Equivalence of the Conditional Gradient and Exchange Methods
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abstract
We study an optimization program over nonnegative Borel measures that encourages sparsity in its solution. Efficient solvers for this program are in increasing demand, as it arises when learning from data generated by a `continuum-of-subspaces' model, a recent trend with applications in signal processing, machine learning, and high-dimensional statistics. We prove that the conditional gradient method (CGM) applied to this infinite-dimensional program, as proposed recently in the literature, is equivalent to the exchange method (EM) applied to its Lagrangian dual, which is a semi-infinite program. In doing so, we formally connect such infinite-dimensional programs to the well-established field of semi-infinite programming. On the one hand, the equivalence established in this paper allows us to provide a rate of convergence for EM which is more general than those existing in the literature. On the other hand, this connection and the resulting geometric insights might in the future lead to the design of improved variants of CGM for infinite-dimensional programs, which has been an active research topic. CGM is also known as the Frank-Wolfe algorithm.
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2019 1verdicts
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On the linear convergence rates of exchange and continuous methods for total variation minimization
Proves eventual linear convergence for exchange and continuous methods in total variation minimization over measures under regularity conditions.