Structure of kissing arrangements in R12 and a place for the 841st sphere

Abstract

Most currently known kissing arrangements of size 840 in R12 share a common structure. They consist of 60 vectors supported on R6×\ 0\, another 60 vectors supported on \ 0\× R6, and 720 additional bridge vectors. The bridge vectors encode the interaction between the two six-dimensional factors and are constructed from the unique 1-factorization of the complete graph K6. In this paper we investigate kissing arrangements of this type while keeping the bridge vectors fixed. We show that each 60-point block admits substantial flexibility: 12 of its vectors may be chosen as the signed coordinate vectors ei, while the remaining 48 vectors may vary within a positive-dimensional family of configurations, which we call 48-systems. As a consequence, we obtain infinitely many pairwise non-isometric kissing arrangements of size 840 in R12. The geometric freedom revealed by these constructions provides new insight into the local structure of extremal configurations. Exploiting this structure, we develop a specialized initialization scheme for logarithmic Riesz energy optimization. Starting from such structurally informed initial configurations, we numerically construct a kissing arrangement of size 841 in R12.