Fast Navigation with Icosahedral Golden Gates
Abstract
An algorithm of Ross and Selinger for the factorization of diagonal elements of PU(2) to within distance was adapted by Parzanchevski and Sarnak into an efficient probabilistic algorithm for any element of PU(2) using at most effective 3p13 factors from certain well-chosen sets associated to a number field and a prime p. The icosahedral super golden gates are one such set associated to Q(5). We leverage recent work of Carvalho Pinto, Petit, and Stier to reduce this bound to 735913, and we implement the algorithm in Python. This represents an improvement by a multiplicative factor of 259≈5.9 over the analogous result for the Clifford+T gates. This is of interest because the icosahedral gates have shortest factorization lengths among all super golden gates.
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