Practical 0.385-Approximation for Submodular Maximization Subject to a Cardinality Constraint

Abstract

Non-monotone constrained submodular maximization plays a crucial role in various machine learning applications. However, existing algorithms often struggle with a trade-off between approximation guarantees and practical efficiency. The current state-of-the-art is a recent 0.401-approximation algorithm, but its computational complexity makes it highly impractical. The best practical algorithms for the problem only guarantee 1/e-approximation. In this work, we present a novel algorithm for submodular maximization subject to a cardinality constraint that combines a guarantee of 0.385-approximation with a low and practical query complexity of O(n+k2). Furthermore, we evaluate the empirical performance of our algorithm in experiments based on various machine learning applications, including Movie Recommendation, Image Summarization, and more. These experiments demonstrate the efficacy of our approach.

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