Please use this identifier to cite or link to this item: http://hdl.handle.net/11452/25350
Title: The group structure of bachet elliptic curves over finite fields f-p
Authors: İkikardeş, Nazlı Yıldız
Uludağ Üniversitesi/Fen-Edebiyat Fakültesi/Matematik Anabilim Dalı.
0000-0002-0700-5774
0000-0002-0700-5774
Demirci, Musa
Soydan, Gökhan
Cangül, İsmail Naci
ABA-6206-2020
J-3505-2017
Keywords: Elliptic curves over finite fields
Rational points
Mathematics
Issue Date: 2009
Publisher: Univ Miskolc Inst Math
Citation: İkikardeş, N. Y. vd. (2009). "The group structure of bachet elliptic curves over finite fields f-p". Miskolc Mathematical Notes, 10(2), 129-136.
Abstract: Bachet elliptic curves are the curves y(2) = x(3) + a(3) and, in this work, the group structure E(F-p) of these curves over finite fields F-p is considered. It is shown that there are two possible structures E(F-p) congruent to Cp+1 or E(F-p) congruent to C-n x C-nm, for m, n is an element of N; according to p equivalent to 5 (mod 6) and p equivalent to 1 (mod 6), respectively. A result of Washington is restated in a more specific way saying that if E(F-p) congruent to Z(n) x Z(n) then p equivalent to 7 (mod 12) p = n(2) -/+ n + 1.
URI: https://doi.org/10.18514/MMN.2009.182
http://mat76.mat.uni-miskolc.hu/mnotes/article/182
http://hdl.handle.net/11452/25350
ISSN: 1787-2405
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