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A Note On Characterizations of Spherical t-Designs

A set ${X}_{N}=\{x_1,\ldots,x_N\}$ of $N$ points on the unit sphere $\mathbb{S}^d,\,d\geq 2$ is a spherical $t$-design if the average of any polynomial of degree at most $t$ over the sphere is equal to the average value of the polynomial over ${X}_{N}$. This paper extends characterizations of spherical $t$-designs in previous paper from $\mathbb{S}^2$ to general $\mathbb{S}^d$. We show that for $N\geq\dim(\mathbb{P}_{t+1})$, $X_N$ is a stationary point set of a certain non-negative quantity $A_{N,\,t}$ and a fundamental system for polynomial space over $\mathbb{S}^d$ with degree at most $t$, then $X_N$ is a spherical $t$-design. In contrast, we present that with $N \geq \dim( \mathbb{P}_{t})$, a fundamental system $X_N$ is a spherical $t$-design if and only if non-negative quantity $D_{N,\,t}$ vanishes. In addition, the still unanswered questions about construction of spherical $t$-designs are discussed.