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Retracts of Products of Chordal Graphs


  • Contract grant sponsor: French-Slovenian Egide PROTEUS project; Contract grant sponsor: Ministry of Science and Technology of Slovenia; Contract grant numbers: J1-2043 and P1-0297 (B. B. and M. K.); Contract grant sponsor: TEOMATRO; Contract grant number: ANR-10-BLAN 0207 (V. C.).


In this article, we characterize the graphs G that are the retracts of Cartesian products of chordal graphs. We show that they are exactly the weakly modular graphs that do not contain K2, 3, the 4-wheel minus one spoke math formula, and the k-wheels math formula (for math formula as induced subgraphs. We also show that these graphs G are exactly the cage-amalgamation graphs as introduced by Brešar and Tepeh Horvat (Cage-amalgamation graphs, a common generalization of chordal and median graphs, Eur J Combin 30 (2009), 1071–1081); this solves the open question raised by these authors. Finally, we prove that replacing all products of cliques of G by products of Euclidean simplices, we obtain a polyhedral cell complex which, endowed with an intrinsic Euclidean metric, is a CAT(0) space. This generalizes similar results about median graphs as retracts of hypercubes (products of edges) and median graphs as 1-skeletons of CAT(0) cubical complexes. © 2012 Wiley Periodicals, Inc. J. Graph Theory 73: 161–180, 2013