Duc Manh Nguyen scite author profile

In this research, we propose a novel construction of quantum stabilizer code based on a binary formalism. First, from any binary vector of even length, we generate the parity-check matrix of the quantum code from a set composed of elements from this vector and its relations by shifts via subtraction and addition. We prove that the proposed matrices satisfy the condition constraint for the construction of quantum codes. Finally, we consider some constraint vectors which give us quantum stabilizer codes with various dimensions and a large minimum distance with code length from six to twelve digits.

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COmparing Continuous Optimizers: numbbo/COCO on Github

Hansen¹,

Brockhoff²,

Mersmann³

et al. 2019

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New Constructions of Quantum Stabilizer Codes Based on Difference Sets

Nguyen¹,

Kim²

2018

Symmetry

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In this paper, new conditions on parameters in difference sets are derived to satisfy symplectic inner product, and new constructions of quantum stabilizer codes are proposed from the conditions. The conversion of the difference sets into parity-check matrices is first explained. Then, the proposed code construction is composed of three steps, which are to choose the generators of quantum stabilizer code, to determine the quantum stabilizer groups, and to determine subspace codewords with large minimum distance. The quantum stabilizer codes with various length are also presented to explain the practicality of the code construction. The proposed design can be applied to quantum stabilizer code construction based on combinatorial design.

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Duc Manh Nguyen

Quantum Key Distribution Protocol Based on Modified Generalization of Deutsch-Jozsa Algorithm in d-level Quantum System

A quantum algorithm based on entanglement measure for classifying Boolean multivariate function into novel hidden classes

A novel construction for quantum stabilizer codes based on binary formalism

COmparing Continuous Optimizers: numbbo/COCO on Github

New Constructions of Quantum Stabilizer Codes Based on Difference Sets

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