{"user_id":"2DF688A6-F248-11E8-B48F-1D18A9856A87","intvolume":"         7","quality_controlled":"1","language":[{"iso":"eng"}],"oa":1,"main_file_link":[{"url":"https://doi.org/10.1007/s40993-021-00267-9","open_access":"1"}],"doi":"10.1007/s40993-021-00267-9","author":[{"first_name":"Matteo","id":"7aa8f170-131e-11ed-88e1-a9efd01027cb","orcid":"0000-0002-0854-0306","last_name":"Verzobio","full_name":"Verzobio, Matteo"}],"volume":7,"_id":"12308","date_published":"2021-05-20T00:00:00Z","publication":"Research in Number Theory","publication_status":"published","day":"20","oa_version":"Published Version","article_type":"original","status":"public","extern":"1","publisher":"Springer Nature","issue":"2","year":"2021","abstract":[{"text":"Let P and Q be two points on an elliptic curve defined over a number field K. For α∈End(E), define Bα to be the OK-integral ideal generated by the denominator of x(α(P)+Q). Let O be a subring of End(E), that is a Dedekind domain. We will study the sequence {Bα}α∈O. We will show that, for all but finitely many α∈O, the ideal Bα has a primitive divisor when P is a non-torsion point and there exist two endomorphisms g≠0 and f so that f(P)=g(Q). This is a generalization of previous results on elliptic divisibility sequences.","lang":"eng"}],"publication_identifier":{"issn":["2522-0160","2363-9555"]},"title":"Primitive divisors of sequences associated to elliptic curves with complex multiplication","month":"05","date_updated":"2023-05-08T12:00:17Z","article_processing_charge":"No","keyword":["Algebra and Number Theory"],"scopus_import":"1","article_number":"37","date_created":"2023-01-16T11:44:39Z","citation":{"mla":"Verzobio, Matteo. “Primitive Divisors of Sequences Associated to Elliptic Curves with Complex Multiplication.” <i>Research in Number Theory</i>, vol. 7, no. 2, 37, Springer Nature, 2021, doi:<a href=\"https://doi.org/10.1007/s40993-021-00267-9\">10.1007/s40993-021-00267-9</a>.","ista":"Verzobio M. 2021. Primitive divisors of sequences associated to elliptic curves with complex multiplication. Research in Number Theory. 7(2), 37.","short":"M. Verzobio, Research in Number Theory 7 (2021).","ieee":"M. Verzobio, “Primitive divisors of sequences associated to elliptic curves with complex multiplication,” <i>Research in Number Theory</i>, vol. 7, no. 2. Springer Nature, 2021.","ama":"Verzobio M. Primitive divisors of sequences associated to elliptic curves with complex multiplication. <i>Research in Number Theory</i>. 2021;7(2). doi:<a href=\"https://doi.org/10.1007/s40993-021-00267-9\">10.1007/s40993-021-00267-9</a>","apa":"Verzobio, M. (2021). Primitive divisors of sequences associated to elliptic curves with complex multiplication. <i>Research in Number Theory</i>. Springer Nature. <a href=\"https://doi.org/10.1007/s40993-021-00267-9\">https://doi.org/10.1007/s40993-021-00267-9</a>","chicago":"Verzobio, Matteo. “Primitive Divisors of Sequences Associated to Elliptic Curves with Complex Multiplication.” <i>Research in Number Theory</i>. Springer Nature, 2021. <a href=\"https://doi.org/10.1007/s40993-021-00267-9\">https://doi.org/10.1007/s40993-021-00267-9</a>."},"type":"journal_article"}