Minimal Lp-congestion spanning trees on weighted graphs

Abstract

A generalization of the notion of spanning tree congestion for weighted graphs is introduced. The Lp congestion of a spanning tree is defined as the Lp norm of the edge congestion of that tree. In this context, the classical congestion is the L∞-congestion. Explicit estimations of the minimal spanning tree Lp congestion for some families of graphs are given. In addition, we introduce a polynomial-time algorithm for approximating the minimal Lp-congestion spanning tree in any weighted graph and another two similar algorithms for weighted planar graphs. The performance of these algorithms is tested in several graphs.