TY  - BOOK
AU  - Nguyen, Ngoc Tuy
PY  - 2009
DA  - 2009//
TI  - Graph powers: hardness results, good characterizations and efficient algorithms
AB  - Given a graph H = (V_H,E_H) and a positive integer k, the k-th power of H, written H^k, is the graph obtained from H by adding edges between any pair of vertices at distance at most k in H; formally, H^k = (V_H, {xy | 1 <= d_H (x, y) <= k}). A graph G is the k-th power of a graph H if G = H^k, and in this case, H is a k-th root of G. Our investigations deal with the computational complexity of recognizing k-th powers of general graphs as well as restricted graphs. This work provides new NP-completeness results, good characterizations and efficient algorithms for graph powers.
UR  - http://rosdok.uni-rostock.de/resolve?urn=urn:nbn:de:gbv:28-diss2009-0206-0
UR  - http://rosdok.uni-rostock.de/resolve?urn=urn:nbn:de:gbv:28-diss2009-0206-0&pdf
UR  - http://nbn-resolving.de/urn:nbn:de:gbv:28-diss2009-0206-0
UR  - http://rosdok.uni-rostock.de/metadata/rosdok_disshab_000000000350
UR  - http://d-nb.info/100097877X/34
LA  - English
N1  - vorgelegt von Ngoc Tuy Nguyen
ID  - 616733836
ER  -