TY - CPAPER
DO - 10.1016/j.dam.2012.03.012
AB - Let T be a triangulated surface given by the list of vertex-triples of its triangles, called rooms. A room-partitioning for T is a subset R of the rooms such that each vertex of T is in exactly one room in R. Given a room-partitioning R for T, the exchange algorithm walks from room to room until it finds a second different room-partitioning R'. In fact, this algorithm generalizes the Lemke-Howson algorithm for finding a Nash equilibrium for two-person games. In this paper, we show that the running time of the exchange algorithm is not polynomial relative to the number of rooms, by constructing a sequence of (planar) instances, in which the algorithm walks from room to room an exponential number of times. We also show a similar result for the problem of finding a second perfect matching in Eulerian graphs. (C) 2012 Elsevier B.V. All rights reserved.
T1 - Exponentiality of the exchange algorithm for finding another room-partitioning
DA - 2014
AU - Edmonds, Jack
AU - Sanita, Laura
JF - Discrete Applied Mathematics
SP - 86-91
VL - 164
EP - 86-91
PB - Elsevier Science Bv
PP - Amsterdam
ID - 198663
KW - Room-partitioning
KW - Exchange algorithm
KW - Two-person games
SN - 0166-218X
ER -