Assume that we are given integers d and k with 0≤k≤d−2 and let ε be a real number in (0,1).
Let δ=δ(d,ε,k)∈(0,1) be a sufficiently small constant.
By (1), there is a positive integer r1=r1(d,δ,k) and a constant c1=c1(d,δ,k) such that for every s∈N t…