Tur\'an numbers and anti-Ramsey numbers for short cycles in complete 3-partite graphs

Abstract

We call a 4-cycle in Kn1, n2, n3 multipartite, denoted by C4multi, if it contains at least one vertex in each part of Kn1, n2, n3. The Tur\'an number ex(Kn1,n2,n3, C4multi) ( respectively, ex(Kn1,n2,n3,\C3, C4multi\) ) is the maximum number of edges in a graph G⊂eq Kn1,n2,n3 such that G contains no C4multi ( respectively, G contains neither C3 nor C4multi ). We call a Cmulti4 rainbow if all four edges of it have different colors. The ant-Ramsey number ar(Kn1,n2,n3, C4multi) is the maximum number of colors in an edge-colored of Kn1,n2,n3 with no rainbow C4multi. In this paper, we determine that ex(Kn1,n2,n3, C4multi)=n1n2+2n3 and ar(Kn1,n2,n3, C4multi)=ex(Kn1,n2,n3, \C3, C4multi\)+1=n1n2+n3+1, where n1 n2 n3 1.