Abstract

In this paper, we present a new bicriteria approximation algorithm for the degree-bounded minimum spanning tree problem. In this problem, we are given an undirected graph, a nonnegative cost function on the edges, and a positive integer B* , and the goal is to find a minimum-cost spanning tree T with maximum degree at most B* . In an n-node graph, our algorithm finds a spanning tree with maximum degree O(B* +logn) and cost O(optB*), where optB* is the minimum cost of any spanning tree whose maximum degree is at most B* . Our algorithm uses ideas from Lagrangean duality. We show how a set of optimum Lagrangean multipliers yields bounds on both the degree and the cost of the computed solution.

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