On the isometric path partition problem

A path(ological) partition problem

Let τ(G) denote the number of vertices in a longest path of the graph G and let k1 and k2 be positive integers such that τ(G) = k1+k2. The question at hand is whether the vertex set V (G) can be partitioned into two subsets V1 and V2 such that τ(G[V1]) ≤ k1 and τ(G[V2]) ≤ k2. We show that several classes of graphs have this partition property.

The Path-partition Problem in Bipartite Distance-hereditary Graphs

A path partition of a graph is a collection of vertex-disjoint paths that cover all vertices of the graph. The path-partition problem is to find a path partition of minimum size. This paper gives a linear-time algorithm for the path-partition problem in bipartite distance-hereditary graphs.

The path partition problem and related problems in bipartite graphs

We prove that it is NP-complete to decide whether a bipartite graph of maximum degree three on nk vertices can be partitioned into n paths of length k. Finally, we propose some approximation and inapproximation results for several related problems.

Corrigendum to "The path-partition problem in block graphs"

Recently, Wong [1] pointed out that Yan and Chang’s [2] linear-time algorithm for the path-partition problem for block graphs is not correct, by giving the following example. Suppose G is the graph consisting of a vertex w and a set of triangles {xi, yi, zi} such that each xi is adjacent to w for 1 i k, where k 3. Then p(G) = k − 1, but Yan and Chang’s algorithm gives p(G)= 1. He also traced th...

Fractional isometric path number