Terminal Steiner tree problem : Complexity and Algorithms

Abstract

Given a connected graph G and a terminal set R ⊂eq V(G), the Steiner tree problem (ST) asks for a tree that spans all of R with at most r vertices from V(G) R, for some integer r≥ 0. It is known from (Garey et al.,1977 ) that ST is NP-complete. A Steiner tree in which all terminal vertices are constrained to be leaves is called a terminal Steiner tree. Our study addresses the existence of a terminal Steiner tree, its complexity across various graph classes, black-box applications of the ST, and a fixed-parameter tractable (FPT) algorithm with respect to the number of terminals.