Between 2- and 3-colorability
Abstract
We consider the question of the existence of homomorphisms between Gn,p and odd cycles when p=c/n,\,1<c≤ 4. We show that for any positive integer , there exists ε=ε() such that if c=1+ε then w.h.p. Gn,p has a homomorphism from Gn,p to C2+1 so long as its odd-girth is at least 2+1. On the other hand, we show that if c=4 then w.h.p. there is no homomorphism from Gn,p to C5. Note that in our range of interest, (Gn,p)=3 w.h.p., implying that there is a homomorphism from Gn,p to C3.
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