Universal Quantum Computation with the S3 Quantum Double: A Pedagogical Exposition
Abstract
Non-Abelian topological order (TO) enables topologically protected quantum computation with its anyonic quasiparticles. Recently, TO with S3 gauge symmetry was identified as a sweet spot -- simple enough to emerge from finite-depth adaptive circuits yet powerful enough to support a universal topological gate-set. In these notes, we review how anyon braiding and measurement in S3 TO are primitives for topological quantum computation and we explicitly demonstrate universality. These topological operations are made concrete in the S3 quantum double lattice model, aided by the introduction of a generalized ribbon operator. This provides a roadmap for near-term quantum platforms.
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