Breaking Barriers: Combinatorial Algorithms for Non-monotone Submodular Maximization with Sublinear Adaptivity and 1/e Approximation
Abstract
With the rapid growth of data in modern applications, parallel algorithms for maximizing non-monotone submodular functions have gained significant attention. In the parallel computation setting, the state-of-the-art approximation ratio of 1/e is achieved by a continuous algorithm (Ene & Nguyen, 2020) with adaptivity O((n)). In this work, we focus on size constraints and present the first combinatorial algorithm matching this bound -- a randomized parallel approach achieving 1/e- approximation ratio. This result bridges the gap between continuous and combinatorial approaches for this problem. As a byproduct, we also develop a simpler (1/4-)-approximation algorithm with high probability ( 1-1/n). Both algorithms achieve O((n)(k)) adaptivity and O(n(n)(k)) query complexity. Empirical results show our algorithms achieve competitive objective values, with the (1/4-)-approximation algorithm particularly efficient in queries.
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