The crossing number of the complete 4-partite graph K1,1,m,n

Abstract

Let cr(G) denote the crossing number of a graph G. The well-known Zarankiewicz's conjecture (ZC) asserted cr(Km,n) in 1954. In 1971, Harborth gave a conjecture (HC) on cr(Kx1,...,xn). HC on K1,m,n is verified if ZC is true by Ho et al. in 2021. In this paper, we showed the following results: If both m and n are even, then \[cr(K1,1,m,n)≥ 12(cr(Km+1,n+3)+cr(Km+3,n+1)-mn-14(m2+n2));\] If both m and n are odd, then \[cr(K1,1,m,n)≥ 12(cr(K1,m+1,n+1)+cr(K2,m,n)-14(m+1)(n+1)+1);\] If m is even and n is odd, then equation split cr(K1,1,m,n)&≥ 14(cr(Km+1,n+2)+cr(Km+3,n+2)+2cr(K2,m,n) \\&-m(n+1)-14(n+1)2). split equation The lower bounds in our result imply that if both m and n are even and ZC is true, then HC on K1,1,m,n holds; if at least one of m and n is odd and both ZC and HC on K2,m,n are true, then HC on K1,1,m,n holds.