Anti-Ramsey numbers for cancellative configurations in p-graphs

Abstract

We study edge-colorings of the complete p-graph on n vertices that contain no three edges A,B,C of distinct colors such that the symmetric difference of A and B is contained in C. For p3 and n p+1, we show that every such coloring contains at most 1+n/p colors and characterize the extremal colorings, generalizing a theorem of Erdos, Simonovits and S\'os. %erdos1975. When p=3, the condition A B⊂eq C implies |A B|=2, and the three edges necessarily form a copy of F4\abc,abd,bcd\ or F5\abc,abd,cde\. For n5, we show that every rainbow F5-free edge-coloring is rainbow cancellative. For rainbow F4-free colorings, we construct colorings with m(n)+1 colors for all n4, where m(n) is the size of a maximum partial Steiner triple system of order n and satisfies m(n)=n2/6+O(n), improving the linear lower bound by Budden and Stiles. %budden. Moreover, for n=2s-1, we obtain (n,F4) m(n)+n2/42+o(n2)=4n2/21+o(n2) via a construction based on independent sets in the Grassmann graph. We also prove that (n,F4) (5n2-8n)/21 for n4, improving the quadratic coefficient in the upper bound of Budden and Stiles from 1/4 to 5/21.