Estimates of the asymptotic Nikolskii constants for spherical polynomials

Abstract

Let nd denote the space of spherical polynomials of degree at most n on the unit sphere Sd⊂ Rd+1 that is equipped with the surface Lebesgue measure dσ normalized by ∫Sd \, dσ(x)=1. This paper establishes a close connection between the asymptotic Nikolskii constant, L(d):=n ∞ 1 nd f∈ nd \|f\|L∞(Sd)\|f\|L1(Sd), and the following extremal problem: Iα:=∈fak \| jα+1 (t)- Σk=1∞ ak jα ( qα+1,kt/qα+1,1)\|L∞(R+) with the infimum being taken over all sequences \ak\k=1∞⊂ R such that the infinite series converges absolutely a.e. on R+. Here jα denotes the Bessel function of the first kind normalized so that jα(0)=1, and \qα+1,k\k=1∞ denotes the strict increasing sequence of all positive zeros of jα+1. We prove that for α -0.272, Iα= ∫0qα+1,1jα+1(t)t2α+1\,dt∫0qα+1,1t2α+1\,dt= 1F2(α+1;α+2,α+2;-qα+1,124). As a result, we deduce that the constant L(d) goes to zero exponentially fast as d∞: \[ 0.5d L*(d) (0.857·s)d\,(1+d) \ \ \ \ \ with d =O(d-2/3). \]