Rainbow panconnectivity in a graph collection

Abstract

Let G=\G1,…,Gn-1\ be a collection of not necessarily distinct n-vertex graphs with the same vertex set V. A path P with V(P)⊂eq V and |E(P)|≤ n-1 is called rainbow in G, if there exists an injection ϕ E(P) [n-1] such that e∈ E(Gϕ(e)) for each e∈ E(P). The graph collection G is said to be rainbow panconnected if for every pair of vertices x,y∈ V, there exists a rainbow path of k vertices joining x and y in G for every integer k∈ [dG(x,y)+1, n], where dG(x,y) is the length of a shortest rainbow path between x and y in G. In this paper, we study the rainbow panconnectivity of G under the minimum degree condition. Our result improves upon the corresponding results of [J. Graph Theory, 104(2)(2023), 341--359] and [Electron. J. Combin., 32(4)(2025), \#P4.17].