Universal transversal gates with color codes - a simplified approach

Abstract

We provide a simplified, yet rigorous presentation of the ideas from Bomb\'in's paper "Gauge Color Codes" [arXiv:1311.0879v3]. Our presentation is self-contained, and assumes only basic concepts from quantum error correction. We provide an explicit construction of a family of color codes in arbitrary dimensions and describe some of their crucial properties. Within this framework, we explicitly show how to transversally implement the generalized phase gate Rn=diag(1,e2π i/2n), which deviates from the method in "Gauge Color Codes", allowing an arguably simpler proof. We describe how to implement the Hadamard gate H fault-tolerantly using code switching. In three dimensions, this yields, together with the transversal CNOT, a fault-tolerant universal gate set \H,CNOT,R3\ without state-distillation.