The Partial Visibility Representation Extension Problem

Abstract

For a graph G, a function is called a bar visibility representation of G when for each vertex v ∈ V(G), (v) is a horizontal line segment (bar) and uv ∈ E(G) iff there is an unobstructed, vertical, -wide line of sight between (u) and (v). Graphs admitting such representations are well understood (via simple characterizations) and recognizable in linear time. For a directed graph G, a bar visibility representation of G, additionally, puts the bar (u) strictly below the bar (v) for each directed edge (u,v) of G. We study a generalization of the recognition problem where a function ' defined on a subset V' of V(G) is given and the question is whether there is a bar visibility representation of G with (v) = '(v) for every v ∈ V'. We show that for undirected graphs this problem together with closely related problems are -complete, but for certain cases involving directed graphs it is solvable in polynomial time.