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Full embeddings into some categories of graphs. (English) Zbl 0257.05115


MSC:

05C25 Graphs and abstract algebra (groups, rings, fields, etc.)
08A05 Structure theory of algebraic structures
18B15 Embedding theorems, universal categories
05C15 Coloring of graphs and hypergraphs
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References:

[1] V. Chvátal, P. Hell, L. Kučera and J. Nešetřil,Every graph is a full subgraph of a rigid graph, Jour. Comb. Theory11 (1971), 284–286. · Zbl 0231.05107
[2] Z. Hedrlín and E. Mendelsohn,The category of graphs with a given subgraph–with applications to topology and algebra, Can. J. Math.21 (1969), 1506–1517. · Zbl 0196.03702
[3] Z. Hedrlín and J. Lambek,How comprehensive is the category of semigroups?, Journal of Algebra11 (1969), 195–212. · Zbl 0206.02505
[4] Z. Hedrlín and A. Pultr,On full embeddings of categories of algebras, Illinois Jour. of Math.10 (1966), 392–405. · Zbl 0139.01501
[5] Z. Heldrlín and A. Pultr,Symmetric relations (undirected graphs) with given semigroup, Mhf. für Math.68 (1965) 318–322. · Zbl 0139.24803
[6] Z. Hedrlín and others,A treatment, to appear, on approximate homomorphisms
[7] P. Hell,Fragile graphs and some other full embeddings, (to appear)
[8] P. Hell and J. Nešetřil,Graphs andk-societies, Can. Math. Bull.13 (1970), 375–381. · Zbl 0209.32201
[9] E. Mendelsohn,On a technique for representing semigroups as endomorphism semigroups of graphs with given properties, (to appear in Semigroup Forum). · Zbl 0262.20083
[10] B. Mitchell,Theory of categories, (Academic Press, N. Y. and London, 1965). · Zbl 0136.00604
[11] J. Sichler,Non constant endomorphism of lattices, (to appear). · Zbl 0249.06003
[12] J. Sichler,Testing categories and strong universality, (to appear). · Zbl 0265.18006
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