The L(2,1)-labeling problem consists of assigning colors from the integer set 0, ... , lambda to the nodes of a graph G in such a way that nodes at a distance of at most two get different colors, while adjacent nodes get colors which are at least two apart. The aim of this problem is to minimize A and it is in general NP-complete. In this paper the problem of L(2, 1)-labeling unigraphs, i.e. graphs uniquely determined by their own degree sequence up to isomorphism, is addressed and a 3/2-approximate algorithm for L(2, 1)-labeling unigraphs is designed. This algorithm runs in O(n) time, improving the time of the algorithm based on the greedy technique, requiring O(m) time, that may be near to Theta(n(2)) for unigraphs.
L(2,1)-Labeling of Unigraphs (Extended Abstract) / Calamoneri, Tiziana; Petreschi, Rossella. - STAMPA. - 6595:(2011), pp. 57-68. (Intervento presentato al convegno 1st International ICST Conference on Theory and Practice of Algorithms in Computer Systems tenutosi a Rome, ITALY nel APR 18-20, 2011) [10.1007/978-3-642-19754-3_8].
L(2,1)-Labeling of Unigraphs (Extended Abstract)
CALAMONERI, Tiziana;PETRESCHI, Rossella
2011
Abstract
The L(2,1)-labeling problem consists of assigning colors from the integer set 0, ... , lambda to the nodes of a graph G in such a way that nodes at a distance of at most two get different colors, while adjacent nodes get colors which are at least two apart. The aim of this problem is to minimize A and it is in general NP-complete. In this paper the problem of L(2, 1)-labeling unigraphs, i.e. graphs uniquely determined by their own degree sequence up to isomorphism, is addressed and a 3/2-approximate algorithm for L(2, 1)-labeling unigraphs is designed. This algorithm runs in O(n) time, improving the time of the algorithm based on the greedy technique, requiring O(m) time, that may be near to Theta(n(2)) for unigraphs.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
