Pareto optimization for subset selection with dynamic cost constraints

In this paper, we consider the subset selection problem for function f with constraint bound B which changes over time. We point out that adaptive variants of greedy approaches commonly used in the area of submodular optimization are not able to maintain their approximation quality. Investigating the recently introduced POMC Pareto optimization approach, we show that this algorithm efficiently computes a φ = (αf/2)(1− α1f )-approximation, where αf is the sube modularity ratio of f, for each possible constraint bound b ≤ B. Furthermore, we show that POMC is able to adapt its set of solutions quickly in the case that B increases. Our experimental investigations for the influence maximization in social networks show the advantage of POMC over generalized greedy algorithms.

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Dynamic Mutation Based Pareto Optimization for Subset Selection

Intelligent Computing Methodologies - Lecture Notes in Computer Science ◽

10.1007/978-3-319-95957-3_4 ◽

2018 ◽

pp. 25-35 ◽

Cited By ~ 2

Author(s):

Mengxi Wu ◽

Chao Qian ◽

Ke Tang

Keyword(s):

Subset Selection ◽

Pareto Optimization ◽

Dynamic Mutation

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Near-Optimal Graph Signal Sampling by Pareto Optimization

Sensors ◽

10.3390/s21041415 ◽

2021 ◽

Vol 21 (4) ◽

pp. 1415

Author(s):

Dongqi Luo ◽

Binqiang Si ◽

Saite Zhang ◽

Fan Yu ◽

Jihong Zhu

Keyword(s):

State Of The Art ◽

Greedy Algorithms ◽

Empirical Studies ◽

Subset Selection ◽

Reconstruction Error ◽

Pareto Optimization ◽

Signal Sampling ◽

Approximation Bound ◽

Sampling Problem ◽

Optimal Graph

In this paper, we focus on the bandlimited graph signal sampling problem. To sample graph signals, we need to find small-sized subset of nodes with the minimal optimal reconstruction error. We formulate this problem as a subset selection problem, and propose an efficient Pareto Optimization for Graph Signal Sampling (POGSS) algorithm. Since the evaluation of the objective function is very time-consuming, a novel acceleration algorithm is proposed in this paper as well, which accelerates the evaluation of any solution. Theoretical analysis shows that POGSS finds the desired solution in quadratic time while guaranteeing nearly the best known approximation bound. Empirical studies on both Erdos-Renyi graphs and Gaussian graphs demonstrate that our method outperforms the state-of-the-art greedy algorithms.

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Decomposition-based Pareto optimization for subset selection

Scientia Sinica Informationis ◽

10.1360/n112016-00045 ◽

2016 ◽

Vol 46 (9) ◽

pp. 1276-1287

Author(s):

Chao QIAN ◽

Zhi-Hua ZHOU

Keyword(s):

Subset Selection ◽

Pareto Optimization

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Fast Pareto Optimization for Subset Selection with Dynamic Cost Constraints

Proceedings of the Thirtieth International Joint Conference on Artificial Intelligence ◽

10.24963/ijcai.2021/302 ◽

2021 ◽

Author(s):

Chao Bian ◽

Chao Qian ◽

Frank Neumann ◽

Yang Yu

Keyword(s):

Objective Function ◽

Greedy Algorithm ◽

Real World ◽

Fundamental Problem ◽

Subset Selection ◽

Selection Strategy ◽

Cost Constraints ◽

Approximation Guarantee ◽

Changes Over Time ◽

Over Time

Subset selection with cost constraints is a fundamental problem with various applications such as influence maximization and sensor placement. The goal is to select a subset from a ground set to maximize a monotone objective function such that a monotone cost function is upper bounded by a budget. Previous algorithms with bounded approximation guarantees include the generalized greedy algorithm, POMC and EAMC, all of which can achieve the best known approximation guarantee. In real-world scenarios, the resources often vary, i.e., the budget often changes over time, requiring the algorithms to adapt the solutions quickly. However, when the budget changes dynamically, all these three algorithms either achieve arbitrarily bad approximation guarantees, or require a long running time. In this paper, we propose a new algorithm FPOMC by combining the merits of the generalized greedy algorithm and POMC. That is, FPOMC introduces a greedy selection strategy into POMC. We prove that FPOMC can maintain the best known approximation guarantee efficiently.

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On Subset Selection with General Cost Constraints

Proceedings of the Twenty-Sixth International Joint Conference on Artificial Intelligence ◽

10.24963/ijcai.2017/364 ◽

2017 ◽

Cited By ~ 7

Author(s):

Chao Qian ◽

Jing-Cheng Shi ◽

Yang Yu ◽

Ke Tang

Keyword(s):

Objective Function ◽

Greedy Algorithm ◽

Subset Selection ◽

Approximation Ratio ◽

Selection Problem ◽

Iterative Approach ◽

Cost Constraints ◽

General Approximation ◽

Approximation Guarantee

This paper considers the subset selection problem with a monotone objective function and a monotone cost constraint, which relaxes the submodular property of previous studies. We first show that the approximation ratio of the generalized greedy algorithm is $\frac{\alpha}{2}(1 \textendash \frac{1}{e^{\alpha}})$ (where $\alpha$ is the submodularity ratio); and then propose POMC, an anytime randomized iterative approach that can utilize more time to find better solutions than the generalized greedy algorithm. We show that POMC can obtain the same general approximation guarantee as the generalized greedy algorithm, but can achieve better solutions in cases and applications.

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