This paper considers the multiset selection problem with size constraints, which arises in many real-world applications such as budget allocation. Previous studies required the objective function f to be submodular, while we relax this assumption by introducing the notion of the submodularity ratios (denoted by α_f and β_f). We propose an anytime randomized iterative approach POMS, which maximizes the given objective f and minimizes the multiset size simultaneously. We prove that POMS using a reasonable time achieves an approximation guarantee of max{1-1/e^(β_f), (α_f/2)(1-1/e^(α_f))}. Particularly, when f is submdoular, this bound is at least as good as that of the previous greedy-style algorithms. In addition, we give lower bounds on the ...
Subset selection, which aims to select a subset from a ground set to maximize some objective functio...
Subset selection, i.e., to select a limited number of items optimizing some given objective function...
Submodular maximization arises in many applications, and has attracted a lot of research attentions ...
Presented at Thirty-Third AAAI Conference on Artificial IntelligenceIn this paper, we consider the s...
In this paper, we consider the subset selection problem for function f with constraint bound B which...
The problem of selecting a sequence of items that maximizes a given submodular function appears in m...
In this paper, we study the problem of selecting a subset from a ground set to maximize a monotone o...
In this study, we consider the subset selection problems with submodular or monotone discrete object...
The concept of submodularity plays a vital role in com-binatorial optimization. In particular, many ...
| openaire: EC/H2020/759557/EU//ALGOComMotivated by applications in machine learning, such as subset...
We consider the budget allocation problem over bipartite influence model proposed by Alon et al. (Al...
Motivated by applications in machine learning, such as subset selection and data summarization, we c...
We investigate two new optimization problems — minimizing a submodular function subject to a submodu...
We investigate two new optimization problems — minimizing a submodular function subject to a submodu...
We study the worst-case adaptive optimization problem with budget constraint that is useful for mode...
Subset selection, which aims to select a subset from a ground set to maximize some objective functio...
Subset selection, i.e., to select a limited number of items optimizing some given objective function...
Submodular maximization arises in many applications, and has attracted a lot of research attentions ...
Presented at Thirty-Third AAAI Conference on Artificial IntelligenceIn this paper, we consider the s...
In this paper, we consider the subset selection problem for function f with constraint bound B which...
The problem of selecting a sequence of items that maximizes a given submodular function appears in m...
In this paper, we study the problem of selecting a subset from a ground set to maximize a monotone o...
In this study, we consider the subset selection problems with submodular or monotone discrete object...
The concept of submodularity plays a vital role in com-binatorial optimization. In particular, many ...
| openaire: EC/H2020/759557/EU//ALGOComMotivated by applications in machine learning, such as subset...
We consider the budget allocation problem over bipartite influence model proposed by Alon et al. (Al...
Motivated by applications in machine learning, such as subset selection and data summarization, we c...
We investigate two new optimization problems — minimizing a submodular function subject to a submodu...
We investigate two new optimization problems — minimizing a submodular function subject to a submodu...
We study the worst-case adaptive optimization problem with budget constraint that is useful for mode...
Subset selection, which aims to select a subset from a ground set to maximize some objective functio...
Subset selection, i.e., to select a limited number of items optimizing some given objective function...
Submodular maximization arises in many applications, and has attracted a lot of research attentions ...