Abstract
The Graovac–Pisanski index is a symmetry-based version of the well-known Wiener topological index. The aim of this paper is to compute this invariant for both armchair and zig-zag polyhex carbon nanotubes marking important theoretical considerations on their relative stability and the effects of the edge states. We also compare the Graovac–Pisanski and Wiener descriptors and present some open questions.