Determining L(2,1)-Span in Polynomial Space

Abstract

A k-L(2,1)-labeling of a graph is a function from its vertex set into the set \0,...,k\, such that the labels assigned to adjacent vertices differ by at least 2, and labels assigned to vertices of distance 2 are different. It is known that finding the smallest k admitting the existence of a k-L(2,1)-labeling of any given graph is NP-Complete. In this paper we present an algorithm for this problem, which works in time O( n) and polynomial memory, where is an arbitrarily small positive constant. This is the first exact algorithm for L(2,1)-labeling problem with time complexity O(cn) for some constant c and polynomial space complexity.