Chebyshev-type cubature formulas for doubling weights on spheres, balls and simplexes

Abstract

This paper proves that given a doubling weight w on the unit sphere Sd-1 of Rd, there exists a positive constant Kw such that for each positive integer n and each integer N≥ x∈ Sd-1 Kw w(B(x, n-1)), there exists a set of N distinct nodes z1,·s, zN on Sd-1 which admits a strict Chebyshev-type cubature formula (CF) of degree n for the measure w(x) dσd(x), 1w(Sd-1) ∫Sd-1 f(x) w(x)\, dσd(x)= 1N Σj=1N f(zj),\ \ ∀ f∈nd, and which, if in addition w∈ L∞(Sd-1), satisfies 1≤ i≠ j≤ Nd(zi,zj)≥ cw,d N-1d-1 for some positive constant cw,d. Here, dσd and d(·, ·) denote the surface Lebesgue measure and the geodesic distance on Sd-1 respectively, B(x,r) denotes the spherical cap with center x∈Sd-1 and radius r>0, w(E)=∫E w(x) \, dσd(x) for E⊂Sd-1, and nd denotes the space of all spherical polynomials of degree at most n on Sd-1. It is also shown that the minimal number of nodes Nn (wdσd) in a strict Chebyshev-type CF of degree n for a doubling weight w on Sd-1 satisfies Nn (wdσd) x∈ Sd-1 1 w(B(x, n-1)),\ \ n=1,2,·s. Proofs of these results rely on new convex partitions of Sd-1 that are regular with respect to a given weight w and integer N. Our results extend the recent results of Bondarenko, Radchenko, and Viazovska on spherical designs ( Ann. of Math. (2) 178(2013), no. 2, 443--452, Constr. Approx. 41(2015), no. 1, 93--112).