DMGT

Discussiones Mathematicae Graph Theory 23(2) (2003) 273-285
DOI: https://doi.org/10.7151/dmgt.1202

WEAK -RECONSTRUCTION OF CARTESIAN PRODUCTS

Wilfried Imrich

Montanuniversität Leoben
Institut für Mathematik und Angewandte Geometrie
Franz-Josef Straß e 18, A-8700 Leoben, Austria
e-mail: imrich@unileoben.ac.at

Blaz Zmazek and Janez Zerovnik

University of Maribor
Faculty of Mechanical Engineering
Smetanova 17, 2000 Maribor, Slovenia
and
IMFM, Jadranska 19, Ljubljana
e-mail: Blaz.Zmazek@uni-mb.si
e-mail: Janez.Zerovnik@uni-lj.si

Abstract

By Ulam's conjecture every finite graph G can be reconstructed from its deck of vertex deleted subgraphs. The conjecture is still open, but many special cases have been settled. In particular, one can reconstruct Cartesian products.

We consider the case of k-vertex deleted subgraphs of Cartesian products, and prove that one can decide whether a graph H is a k-vertex deleted subgraph of a Cartesian product G with at least k+1 prime factors on at least k+1 vertices each, and that H uniquely determines G.

This extends previous work of the authors and Sims. The paper also contains a counterexample to a conjecture of MacAvaney.

Keywords: reconstruction problem, Cartesian product, composite graphs.

2000 Mathematics Subject Classification: 05C.

References

[1]	W. Dörfler, Some results on the reconstruction of graphs, Colloq. Math. Soc. János Bolyai, 10, Keszthely, Hungary (1973) 361-383.
[2]	T. Feder, Product graph representations, J. Graph Theory 16 (1992) 467-488, doi: 10.1002/jgt.3190160508.
[3	J. Feigenbaum and R. Haddad, On factorable extensions and subgraphs of prime graphs, SIAM J. Discrete Math. 2 (1989) 197-218.
[4]	J. Fisher, A counterexample to the countable version of a conjecture of Ulam, J. Combin. Theory 7 (1969) 364-365, doi: 10.1016/S0021-9800(69)80063-3.
[5]	J. Hagauer and J. Zerovnik, An algorithm for the weak reconstruction of Cartesian-product graphs, J. Combin. Information & System Sciences 24 (1999) 87-103.
[6	W. Imrich, Embedding graphs into Cartesian products, Graph Theory and Applications: East and West, Ann. New York Acad. Sci. 576 (1989) 266-274.
[7]	W. Imrich and S. Klavžar, Product Graphs: Structure and Recognition (John Wiley & Sons, New York, 2000).
[8]	W. Imrich and J. Zerovnik, Factoring Cartesian product graphs, J. Graph Theory 18 (1994) 557-567.
[9]	W. Imrich and J. Zerovnik, On the weak reconstruction of Cartesian-product graphs, Discrete Math. 150 (1996) 167-178, doi: 10.1016/0012-365X(95)00185-Y.
[10]	S. Klavžar, personal communication.
[11]	K.L. MacAvaney, A conjecture on two-vertex deleted subgraphs of Cartesian products, Lecture Notes in Math. 829 (1980) 172-185, doi: 10.1007/BFb0088911.
[12]	G. Sabidussi, Graph multiplication, Math. Z. 72 (1960) 446-457, doi: 10.1007/BF01162967.
[13]	J. Sims, Stability of the cartesian product of graphs (M. Sc. thesis, University of Melbourne, 1976).
[14]	J. Sims and D.A. Holton, Stability of cartesian products, J. Combin. Theory (B) 25 (1978) 258-282, doi: 10.1016/0095-8956(78)90002-3.
[15]	S.M. Ulam, A Collection of Mathematical Problems, (Wiley, New York, 1960) p. 29.

Received 26 September 2001
Revised 12 April 2002