Infinite Cliques in Simple and Stable Graphs
Abstract
Suppose that G is a graph of cardinality μ+ with chromatic number (G)≥ μ+. One possible reason that this could happen is if G contains a clique of size μ+. We prove that this is indeed the case when the edge relation is stable. When G is a random graph (which is simple but not stable), this is not true. But still if in general the complete theory of G is simple, G must contain finite cliques of unbounded sizes.
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