... h(1; p) − h(0; p)=n +1− 1=n. The hypersurface sections and points in uniform position 31Then hW(1) = n. Hence W is again a nondegenerate variet y of Pn−1k(α). InthecasedimV =1, we get dim ... φ).It is well known [4, Proposition 2.2] that Lαis uniquely determined up to isomorphisms. The hypersurface sections and points in uniform position 27Lemma 1.1. [4, Theorem 3.4] Let L be a finitely ... as(λ,y). The hypersurface sections and points in uniform position 29By transformation xi= yi,i =0, ,n, and chose a =1b0(λ), the form at(x)iswhatwewanted.We proceed now to recall the n...