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RESIDUAL PROPERTIES OF SIMPLE GRAPHS

Published online by Cambridge University Press:  18 August 2010

BELINDA TROTTA*
Affiliation:
Department of Mathematics and Statistics, La Trobe University, Bundoora, Victoria 3086, Australia (email: B.Trotta@mmassociates.com.au)
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Abstract

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Clark et al. [‘The axiomatizability of topological prevarieties’, Adv. Math.218 (2008), 1604–1653] have shown that, for k≥2, there exists a Boolean topological graph that is k-colourable but not topologically k-colourable; that is, for every ϵ>0, it cannot be coloured by a paintbrush of width ϵ. We generalize this result to show that, for k≥2, there is a Boolean topological graph that is 2-colourable but not topologically k-colourable. This graph is an inverse limit of finite graphs which are shown to exist by an Erdős-style probabilistic argument of Hell and Nešetřil [‘The core of a graph’, Discrete Math.109 (1992), 117–126]. We use the fact that there exists a Boolean topological graph that is 2-colourable but not k-colourable, and some other results (some new and some previously known), to answer the question of which finitely generated topological residual classes of graphs are axiomatizable by universal Horn sentences. A more general version of this question was raised in the above-mentioned paper by Clark et al., and has been investigated by various authors for other structures.

Type
Research Article
Copyright
Copyright © Australian Mathematical Publishing Association Inc. 2010

References

[1]Burris, S. and Sankappanavar, H. P., ‘A course in universal algebra’, online athttp://www.math.uwaterloo.ca/∼snburris/htdocs/ualg.html, originally published in 1981.CrossRefGoogle Scholar
[2]Caicedo, X., ‘Finitely axiomatisable quasivarieties of graphs’, Algebra Universalis 34 (1995), 314321.CrossRefGoogle Scholar
[3]Clark, D. M., Davey, B. A., Freese, R. S. and Jackson, M., ‘Standard topological algebras: syntactic and principal congruences and profiniteness’, Algebra Universalis 52 (2004), 343376.CrossRefGoogle Scholar
[4]Clark, D. M., Davey, B. A., Haviar, M., Pitkethly, J. G. and Talukder, M. R., ‘Standard topological quasi-varieties’, Houston J. Math. 4 (2003), 859887.Google Scholar
[5]Clark, D. M., Davey, B. A., Jackson, M. G. and Pitkethly, J. G., ‘The axiomatizability of topological prevarieties’, Adv. Math. 218 (2008), 16041653.CrossRefGoogle Scholar
[6]Davey, B. A., ‘Natural dualities for structures’, Acta Univ. M. Belii Ser. Math. 13 (2006), 328.Google Scholar
[7]Davey, B. A. and Talukder, M. R., ‘Dual categories for endodualisable Heyting algebras: optimization and axiomatization’, Algebra Universalis 53 (2005), 331355.Google Scholar
[8]Edwards, C., ‘Standardness of small topological structures’, MSc Thesis, La Trobe University, 2005.Google Scholar
[9]Feder, T. and Vardi, M. Y., ‘The computational structure of monotone monadic SNP and constraint satisfaction: a study through Datalog and group theory’, SIAM J. Comput. 28 (1998), 57104.CrossRefGoogle Scholar
[10]Hell, P. and Nešetřil, J., ‘The core of a graph’, Discrete Math. 109 (1992), 117126.CrossRefGoogle Scholar
[11]Hodkinson, I. and Venema, Y., ‘Canonical varieties with no canonical axiomatisation’, Trans. Amer. Math. Soc. 357 (2005), 45794605.CrossRefGoogle Scholar
[12]Jackson, M., ‘Residual bounds for compact totally disconnected algebras’, Houston J. Math. 34 (2008), 3367.Google Scholar
[13]Nešetřil, J. and Pultr, A., ‘On classes of relations and graphs determined by subobjects and factorobjects’, Discrete Math. 22 (1978), 287300.CrossRefGoogle Scholar
[14]Stralka, A., ‘A partially ordered space which is not a Priestley space’, Semigroup Forum 20 (1980), 293297.CrossRefGoogle Scholar
[15]Trotta, B., ‘Residual properties of pre-bipartite digraphs’, Algebra Universalis, to appear.Google Scholar
[16]Trotta, B., ‘Residual properties of reflexive anti-symmetric digraphs’, Houston J. Math., to appear.Google Scholar