Approximation of the Lebesgue constant of a Lagrange polynomial by a logarithmic function with shifted argument (Q2226896)

The classical trigonometric interpolation Lagrange polynomials of \(n\)-th degree at an even and odd number of equidistant nodes are considered. Approximations of the Lebesgue constants by the logarithmic functions with two parameters \(\frac{2}{\pi }\ln (n+a)+b,\) \(n\in \mathbb{N},\) \((a,b)\in \lbrack 0,1]\times \lbrack 0,2]\subset R^{2}\) are obtained.