Abstract
Given a system (V,f,r) on a finite set V consisting of a posi-modular function f: 2 V ?? and a modulotone function r: 2 V ??, we consider the problem of finding a minimum set R ? V such that f(X) ? r(X) for all X ? V ? R. The problem, called the transversal problem, was introduced by Sakashita et al. [6] as a natural generalization of the source location problem and external network problem with edge-connectivity requirements in undirected graphs and hypergraphs. By generalizing [8] for the source location problem, we show that the transversal problem can be solved by a simple greedy algorithm if r is ?-monotone, where a modulotone function r is ?-monotone if there exists a permutation ? of V such that the function $p_r: V \times 2^V \rightarrow \mathbb{R}$ associated with r satisfies p r (u,W) ? p r (v, W) for all W ? V and u,v ? V with ?(u) ? ?(v). Here we show that any modulotone function r can be characterized by p r as r(X) = max {p r (v,W)|v ? X ? V ? W}. We also show the structural properties on the minimal deficient sets ${\cal W}$ for the transversal problem for ?-monotone function r, i.e., there exists a basic tree T for ${\cal W}$ such that ?(u) ≤ ?(v) for all arcs (u,v) in T, which, as a corollary, gives an alternative proof for the correctness of the greedy algorithm for the source location problem. Furthermore, we show that a fractional version of the transversal problem can be solved by the algorithm similar to the one for the transversal problem.
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