On the largest critical value of Tn(k)

Abstract

We study the quantity τn,k:=|Tn(k)(ωn,k)|Tn(k)(1)\,, where Tn is the Chebyshev polynomial of degree n, and ωn,k is the rightmost zero of Tn(k+1). Since the absolute values of the local maxima of Tn(k) increase monotonically towards the end-points of [-1,1], the value τn,k shows how small is the largest critical value of \,Tn(k)\, relative to its global maximum \,Tn(k)(1). In this paper, we improve and extend earlier estimates by Erdos--Szego, Eriksson and Nikolov in several directions. Firstly, we show that the sequence \,\τn,k\n=k+2∞ is monotonically decreasing in n, hence derive several sharp estimates, in particular τn,k cases τk+4,k = 12k+1\,3k+3\,, & n k+4\, τk+6,k = 12k+1\, (5k+5)2 βk\,, & n k+6\,, cases where βk < 2+105 ≈ 1.032. We also obtain an upper bound which is uniform in n and k, and that implies in particular τn,k ≈ (2e)k, n k3/2; τn,n-m ≈ (em2)m/2 n-m/2; τn,n/2 ≈ (427)n/2. Finally, we derive the exact asymptotic formulae for the quantities τk* := n∞τn,k and τm** := n∞ nm/2 τn,n-m\,, which show that our upper bounds for τn,k and τn,n-m are asymptotically correct with respect to the exponential terms given above.