Staff View: Cryptanalysis on prime power RSA modulus of the form N=prq

Cryptanalysis on prime power RSA modulus of the form N=prq

Let \(N = p^r q\) be an RSA prime power modulus for \(r \geq 2\) and \(q < p < 2 q\). This paper propose three new attacks. In the first attack we consider the class of public exponents satisfying an equation \(e X - N Y = u p^r + \frac{q^r}{u} + Z\) for suitably small positive integer \(u\)....

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Main Authors:	Kamel Ariffin, Muhammad Rezal, Shehu, Sadiq
Format:	Article
Language:	English
Published:	2016
Online Access:	http://psasir.upm.edu.my/id/eprint/55401/1/Cryptanalysis%20on%20prime%20power%20RSA%20modulus%20of%20the%20form%20N%3Dprq.pdf http://psasir.upm.edu.my/id/eprint/55401/
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spelling	my.upm.eprints.554012017-10-02T09:07:14Z http://psasir.upm.edu.my/id/eprint/55401/ Cryptanalysis on prime power RSA modulus of the form N=prq Kamel Ariffin, Muhammad Rezal Shehu, Sadiq Let \(N = p^r q\) be an RSA prime power modulus for \(r \geq 2\) and \(q < p < 2 q\). This paper propose three new attacks. In the first attack we consider the class of public exponents satisfying an equation \(e X - N Y = u p^r + \frac{q^r}{u} + Z\) for suitably small positive integer \(u\). Using continued fraction we show that \(\frac{Y}{X}\) can be recovered among the convergents of the continued fraction expansion of \(\frac{e}{N}\) and leads to the successful factorization of \(N p^r q\). Moreover we show that the number of such exponents is at least \(N^{\frac{r+3}{2(r+1)}-\varepsilon}\) where \(\varepsilon \geq 0\) is arbitrarily small for large \(N\). The second and third attacks works when \(k\) RSA public keys \((N_i,e_i)\) are such that there exist \(k\) relations of the shape \(e_i x - N_i y_i = p_i^r u + \frac{q_i^r}{u} + z_i\) or of the shape \(e_i x_i - N_i y = p_i^r u + \frac{q_i^r}{u} + z_i\) where the parameters \(x\), \(x_i\), \(y\), \(y_i\), \(z_i\) are suitably small in terms of the prime factors of the moduli. We apply the LLL algorithm, and show that our strategy enable us to simultaneously factor the \(k\) prime power RSA moduli \(N_i\). 2016 Article PeerReviewed application/pdf en http://psasir.upm.edu.my/id/eprint/55401/1/Cryptanalysis%20on%20prime%20power%20RSA%20modulus%20of%20the%20form%20N%3Dprq.pdf Kamel Ariffin, Muhammad Rezal and Shehu, Sadiq (2016) Cryptanalysis on prime power RSA modulus of the form N=prq. International Journal of Applied Mathematical Research, 5 (4). pp. 167-175. ISSN 2227-4324 10.14419/ijamr.v5i4.6494
institution	Universiti Putra Malaysia
building	UPM Library
collection	Institutional Repository
continent	Asia
country	Malaysia
content_provider	Universiti Putra Malaysia
content_source	UPM Institutional Repository
url_provider	http://psasir.upm.edu.my/
language	English
description	Let \(N = p^r q\) be an RSA prime power modulus for \(r \geq 2\) and \(q < p < 2 q\). This paper propose three new attacks. In the first attack we consider the class of public exponents satisfying an equation \(e X - N Y = u p^r + \frac{q^r}{u} + Z\) for suitably small positive integer \(u\). Using continued fraction we show that \(\frac{Y}{X}\) can be recovered among the convergents of the continued fraction expansion of \(\frac{e}{N}\) and leads to the successful factorization of \(N p^r q\). Moreover we show that the number of such exponents is at least \(N^{\frac{r+3}{2(r+1)}-\varepsilon}\) where \(\varepsilon \geq 0\) is arbitrarily small for large \(N\). The second and third attacks works when \(k\) RSA public keys \((N_i,e_i)\) are such that there exist \(k\) relations of the shape \(e_i x - N_i y_i = p_i^r u + \frac{q_i^r}{u} + z_i\) or of the shape \(e_i x_i - N_i y = p_i^r u + \frac{q_i^r}{u} + z_i\) where the parameters \(x\), \(x_i\), \(y\), \(y_i\), \(z_i\) are suitably small in terms of the prime factors of the moduli. We apply the LLL algorithm, and show that our strategy enable us to simultaneously factor the \(k\) prime power RSA moduli \(N_i\).
format	Article
author	Kamel Ariffin, Muhammad Rezal Shehu, Sadiq
spellingShingle	Kamel Ariffin, Muhammad Rezal Shehu, Sadiq Cryptanalysis on prime power RSA modulus of the form N=prq
author_facet	Kamel Ariffin, Muhammad Rezal Shehu, Sadiq
author_sort	Kamel Ariffin, Muhammad Rezal
title	Cryptanalysis on prime power RSA modulus of the form N=prq
title_short	Cryptanalysis on prime power RSA modulus of the form N=prq
title_full	Cryptanalysis on prime power RSA modulus of the form N=prq
title_fullStr	Cryptanalysis on prime power RSA modulus of the form N=prq
title_full_unstemmed	Cryptanalysis on prime power RSA modulus of the form N=prq
title_sort	cryptanalysis on prime power rsa modulus of the form n=prq
publishDate	2016
url	http://psasir.upm.edu.my/id/eprint/55401/1/Cryptanalysis%20on%20prime%20power%20RSA%20modulus%20of%20the%20form%20N%3Dprq.pdf http://psasir.upm.edu.my/id/eprint/55401/
_version_	1643835883857641472
score	13.159267

Cryptanalysis on prime power RSA modulus of the form N=prq

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