On the existence and non-existence of spherical m-stiff configurations
Abstract
This paper investigates the existence of m-stiff configurations in the unit sphere Sd-1, which are spherical (2m-1)-designs that lie on m parallel hyperplanes. We establish two non-existence results: (1) for each fixed integer m > 5, there exists no m-stiff configuration in Sd-1 for sufficiently large d; (2) for each fixed integer d > 10, there exists no m-stiff configuration in Sd-1 for sufficiently large m. Furthermore, we provide a complete classification of the dimensions where m-stiff configurations exist for m=2,3,4,5. We also determine the non-existence (and the existence) of m-stiff configurations in Sd-1 for small d (3 ≤ d ≤ 120) with arbitrary m, and also for small m (6 ≤ m ≤ 10) with arbitrary d. Finally, we conjecture that there is no m-stiff configuration in Sd-1 for (d,m) with d≥ 3 and m≥ 6.
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