Algorithms for the Homogeneous Set Sandwich Problem |
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| Authors: | Celina M.H. de Figueiredo Guilherme D. da Fonseca Vinicius G.P. de Sa Jeremy Spinrad |
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| Affiliation: | (1) Instituto de Matematica and COPPE, Universidade Federal do Rio de Janeiro, Caixa Postal 68530, 21945-970 Rio de Janeiro, RJ, Brazil;(2) Department of Computer Science, University of Maryland, College Park, MD 20742, USA;(3) School of Engineering, Vanderbilt University, 2201 West End Avenue, Nashville, TN 37235, USA |
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| Abstract: | A homogeneous set is a non-trivial module of a graph, i.e. a non-empty, non-unitary, proper subset of a graph's vertices such that all its elements present exactly the same outer neighborhood. Given two graphs   the Homogeneous Set Sandwich Problem (HSSP) asks whether there exists a sandwich graph  which has a homogeneous set. In 2001 Tang et al. published an all-fast  algorithm which was recently proven wrong, so that the HSSP's known upper bound would have been reset thereafter at the former  determined by Cerioli et al. in 1998. We present, notwithstanding, new deterministic algorithms which have it established at  We give as well two even faster  randomized algorithms, whose simplicity might lend them didactic usefulness. We believe that, besides providing efficient easy-to-implement procedures to solve it, the study of these new approaches allows a fairly thorough understanding of the problem. |
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