Let q be a prime power; (q+1,8)-cages have been constructed as incidence
graphs of a non-degenerate quadric surface in projective 4-space P(4,q). The
first contribution of this paper is a construction of these graphs in an
alternative way by means of an explicit formula using graphical terminology.
Furthermore by removing some specific perfect dominating sets from a
(q+1,8)-cage we derive k-regular graphs of girth 8 for k=q−1 and k=q,
having the smallest number of vertices known so far
