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A Novel RFID Anti-Counterfeiting Based on Bisectional Multivariate Quadratic Equations

A Novel RFID Anti-Counterfeiting Based on Bisectional Multivariate Quadratic Equations

Xiaoyi Zhou, Jixin Ma, Xiaoming Yao, Honglei Li
Copyright: © 2018 |Volume: 6 |Issue: 2 |Pages: 9
ISSN: 2166-7160|EISSN: 2166-7179|EISBN13: 9781522546849|DOI: 10.4018/IJSI.2018040101
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MLA

Zhou, Xiaoyi, et al. "A Novel RFID Anti-Counterfeiting Based on Bisectional Multivariate Quadratic Equations." IJSI vol.6, no.2 2018: pp.1-9. http://doi.org/10.4018/IJSI.2018040101

APA

Zhou, X., Ma, J., Yao, X., & Li, H. (2018). A Novel RFID Anti-Counterfeiting Based on Bisectional Multivariate Quadratic Equations. International Journal of Software Innovation (IJSI), 6(2), 1-9. http://doi.org/10.4018/IJSI.2018040101

Chicago

Zhou, Xiaoyi, et al. "A Novel RFID Anti-Counterfeiting Based on Bisectional Multivariate Quadratic Equations," International Journal of Software Innovation (IJSI) 6, no.2: 1-9. http://doi.org/10.4018/IJSI.2018040101

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Abstract

This article proposes a novel scheme for RFID anti-counterfeiting by applying bisectional multivariate quadratic equations (BMQE) system into an RF tag data encryption. In the key generation process, arbitrarily choose two matrix sets (denoted as A and B) and a base RAB such that [(AB) ⃗ ]=λ〖R_AB〗^T, and generate 2n BMQ polynomials (denoted as ρ) over finite field F_q. Therefore, (F_q, ρ) is taken as a public key and (A,B,λ) as a private key. In the encryption process, the EPC code is hashed into a message digest d_m. Then d_m is padded to d_m^' which is a non-zero 2n×2n matrix over F_q. With (A,B,λ)and d_m^', s_m is formed as an n-vector over F_2. Unlike the existing anti-counterfeit scheme, the one the authors proposed is based on quantum cryptography, thus it is robust enough to resist the existing attacks and has high security.

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