On kissing numbers and spherical codes in high dimensions
Abstract
We prove a lower bound of (d3/2 · (2/3)d) on the kissing number in dimension d. This improves the classical lower bound of Chabauty, Shannon, and Wyner by a linear factor in the dimension. We obtain a similar linear factor improvement to the best known lower bound on the maximal size of a spherical code of acute angle θ in high dimensions.
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