An FPTAS for Stochastic Unbounded Min-Knapsack Problem

March 01, 2019 Β· Declared Dead Β· πŸ› Frontiers in Algorithmics

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Authors Zhihao Jiang, Haoyu Zhao arXiv ID 1903.00547 Category cs.DS: Data Structures & Algorithms Citations 2 Venue Frontiers in Algorithmics Last Checked 4 months ago
Abstract
In this paper, we study the stochastic unbounded min-knapsack problem ($\textbf{Min-SUKP}$). The ordinary unbounded min-knapsack problem states that: There are $n$ types of items, and there is an infinite number of items of each type. The items of the same type have the same cost and weight. We want to choose a set of items such that the total weight is at least $W$ and the total cost is minimized. The \prob~generalizes the ordinary unbounded min-knapsack problem to the stochastic setting, where the weight of each item is a random variable following a known distribution and the items of the same type follow the same weight distribution. In \prob, different types of items may have different cost and weight distributions. In this paper, we provide an FPTAS for $\textbf{Min-SUKP}$, i.e., the approximate value our algorithm computes is at most $(1+Ξ΅)$ times the optimum, and our algorithm runs in $poly(1/Ξ΅,n,\log W)$ time.
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