Author/Authors :
H. van der Holst، نويسنده , , J.C. de Pina، نويسنده ,
Abstract :
The following problem is considered: given: an undirected planar graph G=(V,E) embedded in R2, distinct pairs of vertices {r1,s1},…,{rk,sk} of G adjacent to the unbounded face, positive integers b1,…,bk and a function l : E→Z+; find: pairwise vertex-disjoint paths P1,…,Pk such that for each i=1,…,k, Pi is a ri−si-path and the sum of the l-length of all edges in Pi is at most bi. It is shown that the problem is NP-hard in the strong sense. A pseudo-polynomial-time algorithm is given for the case of k=2.
Keywords :
Disjoint paths , Planar graphs , Complexity , Dynamic programming