2023-11-202023-11-202018Bizim, O. ve Gezer, B. (2018). ''Operations on elliptic divisibility sequences''. Bulletin of the Korean Mathematical Society, 55(3), 763-776.1015-8634https://doi.org/10.4134/BKMS.b170227http://koreascience.or.kr/article/JAKO201816269582192.pagehttp://hdl.handle.net/11452/34954In this paper we consider the element-wise (Hadamard) product (or sum) of elliptic divisibility sequences and study the periodic structure of these sequences. We obtain that the element-wise product (or sum) of elliptic divisibility sequences are periodic modulo a prime p like linear recurrence sequences. Then we study periodicity properties of product sequences. We generalize our results to the case of modulo p(l) for some prime p > 3 and positive integer l. Finally we consider the p-adic behavior of product sequences and give a generalization of [9, Theorem 4].eninfo:eu-repo/semantics/closedAccessMathematicsElliptic divisibility sequencesOperations on bilinear sequencesPeriodicity properties of product sequencesElliptic curvesCurvesArticle0004331645000062-s2.0-85047925887763776553MathematicsSet; ABC Conjecture; Divisibility