论文信息 - Measuring the Distance to Series-Parallelity by Path Expressions

Measuring the Distance to Series-Parallelity by Path Expressions

Many graph and network problems are easily solved in the special case of series-parallel networks, but are highly intractable in the general case. This paper considers two complexity measures of two-terminal directed acyclic graphs (st-dags) describing the “distance” of an st-dag from series-parallelity. The two complexity measures are the factoring complexity ψ(G) and the reduction complexity μ(G). Bein, Kamburowski, and Stallmann [3] have shown that ψ(G)≤μ(G)≤n−3, where G is an st-dag with n nodes. They conjectured that ψ(G)=μ(G). This paper gives a proof for this conjecture.

Valeska Naumann

[1] Jerzy Kamburowski,et al. Optimal Reductions of Two-Terminal Directed Acyclic Graphs , 1992, SIAM J. Comput..

[2] David G. Kirkpatrick,et al. On the completeness of a generalized matching problem , 1978, STOC.

[3] Nobuji Saito,et al. Linear-time computability of combinatorial problems on series-parallel graphs , 1982, JACM.

[4] I. Rival. Algorithms and Order , 1988 .

[5] Rolf H. Möhring,et al. Computationally Tractable Classes of Ordered Sets , 1989 .

[6] Peter Brucker,et al. Minimum cost flow algorithms for series-parallel networks , 1985, Discret. Appl. Math..

[7] G. Chartrand,et al. Graphs with Forbidden Subgraphs , 1971 .

[8] A. Satyanarayana,et al. An O(|E|) Time Algorithm for Computing the Reliability of a Class of Directed Networks , 1984, Oper. Res..

[9] J. Scott Provan,et al. The Complexity of Reliability Computations in Planar and Acyclic Graphs , 1986, SIAM J. Comput..

[10] R. Duffin. Topology of series-parallel networks , 1965 .

[11] Eugene L. Lawler,et al. The Recognition of Series Parallel Digraphs , 1982, SIAM J. Comput..