Approximate Min-Sum Subset Convolution
Abstract
Exponential-time approximation has recently gained attention as a practical way to deal with the bitter NP-hardness of well-known optimization problems. We study for the first time the (1 + )-approximate min-sum subset convolution. This enables exponential-time (1 + )-approximation schemes for problems such as minimum-cost k-coloring, the prize-collecting Steiner tree, and many others in computational biology. Technically, we present both a weakly- and strongly-polynomial approximation algorithm for this convolution, running in time O(2n M / ) and O(23n2 / ), respectively. Our work revives research on tropical subset convolutions after nearly two decades.
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