Existence and nonexistence of spherical 5-designs of minimal type

Abstract

This paper investigates the existence and properties of spherical 5-designs of minimal type. We focus on two cases: tight spherical 5-designs and antipodal spherical 4-distance 5-designs. We prove that a tight spherical 5-design is of minimal type if and only if it possesses a specific Q-polynomial coherent configuration structure. For tight spherical 5-designs in Rd of minimal type, we demonstrate that half of the derived code forms an equiangular tight frames (ETF) with parameters (d-1, (d-1)(d+1)3). This provides a sufficient condition for constructing such ETFs from maximal ETFs with parameters (d, d(d+1)2). Moreover, we establish that tight spherical 5-designs of minimal type cannot exist if the dimension d satisfies a certain arithmetic condition, which holds for infinitely many values of d, including d=119 and 527. For antipodal spherical 4-distance 5-designs, we utilize valency theory to derive necessary conditions for certain special types of antipodal spherical 4-distance 5-designs to be of minimal type.