Method of procedural thresholds in qap-based fault tolerance quantum computation

Abstract

A method of constructing a procedural threshold in quotient algebra partition-based fault tolerance quantum computation, which is based on the framework of quotient algebra partition (QAP) applied in the fault tolerance quantum computation (FTQC), wherein an n-qubit fault tolerant encode of a k-qubit quantum gate M, is feasible to a threshold, wherein the method comprises: preparing a quantum code, with a stabilizer; creating an n-qubit encoding, in the quantum code, and obtaining an n-qubit fault tolerant encode of M; factorizing each encoded component, of this n-qubit fault tolerant encode; and producing a detection-correction operator by placing n-k ancilla qubits with the original system of n qubits, wherein the detection-correction operator comprises a conditional detection operator and a conditional correction operator to remove r-qubit spinor error. In terms of this invention, a fault-tolerant computation is conducted by the following criteria given a threshold 0<δ<1: a qubit keeps unchanged if it has the fidelity >δand needs an error-correction if it has the fidelity <δ. Based on this concept, a fault tolerant method is constructed to be feasible to practical experiments composed of noisy systems, leading to scalable fault tolerance quantum computation.