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Abstract We characterize the cases of existence of spherical designs of an odd strength attaining the Fazekas–Levenshtein bound for covering and prove some of their properties. We also find all universal minima of the potential of regular spherical configurations in two new cases: the demihypercube on Sᵈ S d, d 4 d ≥ 4, and the 2₄₁ 2 41 polytope on S⁷ S 7 (which is dual to the E₈ E 8 lattice).
Sergiy Borodachov (Wed,) studied this question.