On \1,2\-distance-balancedness of generalized Petersen graphs

Abstract

A connected graph G of diameter diam(G) is -distance-balanced if |Wxy|=|Wyx| for every x,y∈ V(G) with dG(x,y)=, where Wxy is the set of vertices of G that are closer to x than to y. It is proved that if k 3 and n>k(k+2), then the generalized Petersen graph GP(n,k) is not distance-balanced and that GP(k(k+2),k) is distance-balanced. This significantly improves the main result of Yang et al.\ [Electron.\ J.\ Combin.\ 16 (2009) \#N33]. It is also proved that if k 6, where k is even, and n>54k2+2k, or if k 5, where k is odd, and n>74k2+34k, then GP(n,k) is not 2-distance-balanced. These results partially resolve a conjecture of Miklavic and Sparl [Discrete Appl.\ Math.\ 244 (2018) 143--154].

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