On a new application of Chebyshev polynomials orthogonal on a uniform grid (Q1966285)

The behavior of the expression \(q(n,N)= \inf_{p_n\in \widehat H_n} \sum^N_{j=1} p^2_n(j)\) was studied \((\widehat H\) is the set of algebraic polynomials of degree \(n\) satisfying \(p_n(0)=1\). It was proved for a fixed positive number \(n\leq a\sqrt N\) that there exists a constant \(c=c(a)>0\) such that \(q(nN)\geq c\). If \(n/\sqrt N\to\infty\) then \(\lim_Nq(n,N)=0\). It was mentioned that there exists another way to obtain the lower bound for \(q(n,N)\).