Exact values of rainbow Turán numbers for fan graphs and even wheel graphs

Abstract

An edge-colored graph is called rainbow if all its edges have distinct colors. For a fixed graph H, the rainbow Turán number (n, H) is the maximum number of edges in a properly edge-colored graph with n vertices that does not contain a rainbow subgraph isomorphic to H. A t-fan (t ≥ 2) is a graph formed by t triangles sharing a common vertex. A wheel graph is constructed by connecting a new vertex x to all vertices of a cycle with n vertices. Keevash, Mubayi, Sudakov, Verstraëte~( Combin. Probab. Comput., 2007) showed that \[ (n, Ft) ≥ n24 + (t-1)n2 \] by constructing extremal graphs for n 2 4. In this paper, we propose such a method: for a graph H, the upper bound of (n, H) can be analyzed using the rainbow Turán number of H', where H' is obtained by deleting one vertex from H. By applying this method, we determine the exact values of the rainbow Turán numbers for two families of graphs when the number of vertices n is sufficiently large. Specifically, we obtain: (1) when n > 230t, \[ (n, ) = n24 + (t-1)n2 - , \] where = 1 if n 2 4, and = 0 otherwise; (2) for graphs H satisfying W2t ⊂ H ⊂ (t ≤ s), when n is sufficiently large, \[ (n, H) = cases n24 + (t-1)n2 - & if t is odd, \\ n24 + (t-1)n2 & if t is even. cases \]