On tight Euclidean 6-designs: an experimental result

Abstract

A finite set X n with a weight function w : X >0 is called Euclidean t-design in n (supported by p concentric spheres) if the following condition holds: \[ Σi=1p w(Xi)|Si|∫Si f( x)dσi( x) =Σ x ∈ Xw( x) f( x), \] for any polynomial f( x) ∈ Pol(n) of degree at most t. Here Si n is a sphere of radius ri ≥ 0, Xi=X Si, and σi( x) is an O(n)-invariant measure on Si such that |Si|=rin-1|Sn-1|, with |Si| is the surface area of Si and |Sn-1| is a surface area of the unit sphere in n. Recently, Bajnok (2006) constructed tight Euclidean t-designs in the plane (n=2) for arbitrary t and p. In this paper we show that for case t=6 and p=2, tight Euclidean 6-designs constructed by Bajnok is the unique configuration in n, for 2 ≤ n ≤ 8.