论文信息 - Searching and Pebbling

Searching and Pebbling

Abstract We relate the search number of an undirected graph G with the minimum and maximum of the progressive pebble demands of the directed acyclic graphs obtained by orienting G. Towards this end, we introduce node-searching, a slight variant of searching, in which an edge is cleared by placing searchers on both of its endpoints. We also show that the minimum number of searchers necessary to node-search a graph equals its vertex separator plus one.

Christos H. Papadimitriou | Lefteris M. Kirousis | C. Papadimitriou | L. Kirousis

[1] Fillia Makedon,et al. Topological Bandwidth , 1983, CAAP.

[2] Christos H. Papadimitriou,et al. The Complexity of Searching a Graph (Preliminary Version) , 1981, FOCS.

[3] F. Makedon. Layout problems and their complexity , 1982 .

[4] T. D. Parsons,et al. Pursuit-evasion in a graph , 1978 .

[5] Robert E. Tarjan,et al. Upper and lower bounds on time-space tradeoffs , 1979, STOC '79.

[6] Leslie G. Valiant,et al. On Time Versus Space , 1977, JACM.

[7] Ravi Sethi,et al. Complete register allocation problems , 1973, SIAM J. Comput..

[8] Charles E. Leiserson,et al. Area-Efficient Graph Layouts (for VLSI) , 1980, FOCS.

[9] Friedhelm Meyer auf der Heide,et al. A Comparison of two Variations of a Pebble Game on Graphs , 1981, Theor. Comput. Sci..

[10] Robert E. Tarjan,et al. The Pebbling Problem is Complete in Polynomial Space , 1980, SIAM J. Comput..