Abstract
We present a heuristic approach for convex optimization problems containing different types of sparsity constraints. Whenever the support is required to belong to a matroid, we propose an exchange heuristic adapting the support in every iteration. The entering non-zero is determined by considering the dual multipliers of the bounds on variables being fixed to zero. While this algorithm is purely heuristic, we show experimentally that it often finds near-optimal solutions for cardinality-constrained knapsack problems and for sparse regression problems.
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