A Note on Hardness of Diameter Approximation

Abstract

We revisit the hardness of approximating the diameter of a network. In the CONGEST model of distributed computing, (n) rounds are necessary to compute the diameter [Frischknecht et al. SODA'12], where (·) hides polylogarithmic factors. Abboud et al. [DISC 2016] extended this result to sparse graphs and, at a more fine-grained level, showed that, for any integer 1 ≤ ≤ polylog (n) , distinguishing between networks of diameter 4 + 2 and 6 + 1 requires (n) rounds. We slightly tighten this result by showing that even distinguishing between diameter 2 + 1 and 3 + 1 requires (n) rounds. The reduction of Abboud et al. is inspired by recent conditional lower bounds in the RAM model, where the orthogonal vectors problem plays a pivotal role. In our new lower bound, we make the connection to orthogonal vectors explicit, leading to a conceptually more streamlined exposition.