Lower bounds on the dilation of plane spanners

Abstract

(I) We exhibit a set of 23 points in the plane that has dilation at least 1.4308, improving the previously best lower bound of 1.4161 for the worst-case dilation of plane spanners. (II) For every integer n≥13, there exists an n-element point set S such that the degree 3 dilation of S denoted by δ0(S,3) equals 1+3=2.7321… in the domain of plane geometric spanners. In the same domain, we show that for every integer n≥6, there exists a an n-element point set S such that the degree 4 dilation of S denoted by δ0(S,4) equals 1 + (5-5)/2=2.1755… The previous best lower bound of 1.4161 holds for any degree. (III) For every integer n≥6 , there exists an n-element point set S such that the stretch factor of the greedy triangulation of S is at least 2.0268.