Bounds for spherical codes
Abstract
A set C of unit vectors in Rd is called an L-spherical code if x · y ∈ L for any distinct x,y in C. Spherical codes have been extensively studied since their introduction in the 1970's by Delsarte, Goethals and Seidel. In this note we prove a conjecture of Bukh on the maximum size of spherical codes. In particular, we show that for any set of k fixed angles, one can choose at most O(dk) lines in Rd such that any pair of them forms one of these angles.
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