Solution to a conjecture on resistance distances of block tower graphs

Abstract

Let G be a connected graph. The resistance distance between two vertices u and v of G, denoted by RG[u,v], is defined as the net effective resistance between them in the electric network constructed from G by replacing each edge with a unit resistor. The resistance diameter of G, denoted by Dr(G), is defined as the maximum resistance distance among all pairs of vertices of G. Let Pn=a1a2… an be the n-vertex path graph and C4=b1b2b3b4b1 be the 4-cycle. Then the n-th block tower graph Gn is defined as the the Cartesian product of Pn and C4, that is, Gn=Pn C4. Clearly, the vertex set of Gn is \(ai,bj)|i=1,…,n;j=1,…,4\. In [Discrete Appl. Math. 320 (2022) 387--407], Evans and Francis proposed the following conjecture on resistance distances of Gn and Gn+1: equation* n → ∞(RGn+1[(a1,b1),(an+1,b3)]-RGn[(a1,b1),(an,b3)])=14. equation* In this paper, combining algebraic methods and electrical network approaches, we confirm and further generalize this conjecture. In addition, we determine all the resistance diametrical pairs in Gn, which enables us to give an equivalent explanation of the conjecture.