M-hypergeometric solutions of linear recurrence and q-recurrence equations
Other Title(s)
الحلول الهابرجيومترية لمعادلات ضد الفروقات و معادلات ضد الفروقات-q
Author
Source
Issue
Vol. 24, Issue 1A (30 Apr. 2006), pp.21-33, 13 p.
Publisher
University of Basrah College of Science
Publication Date
2006-04-30
Country of Publication
Iraq
No. of Pages
13
Main Subjects
Topics
Abstract AR
في هذا البحث نتأمل مسالة إيجاد الحلول الهايبرجيومترية m- لمعادلات ضد الفروقات.
نوسع تحليل العوامل الأعظم (GFF) لمتعددة الحدود، المقدم من قبل باول (1995)، إلى تحليل العوامل الأعظمm- (mGFF).
باستخدام مفهوم، نقدم أسلوب جبري للمسالة.
هذا الأسلوب يتطلب فقط عمليات gcd و لا يتطلب التحليل إلى عوامل.
ثم نحل نفس المسالة لمعادلات الفروقاتq-.
Abstract EN
In this paper we consider the problem of finding m -hyper geometric solutions of anti-difference equations.
We extend the greatest factorial factorization (GFF) of a polynomial, introduced by Paule (1995), to the m -greatest factorial factorization (m GFF).
Equipped with the m GFF-concept, we present algebraically motivated approach to the problem.
This approach requires only “gcd” operations but no factorization.
Then, we solve the same problem for q -anti-difference equations.
American Psychological Association (APA)
Sad, Husam Luti. 2006. M-hypergeometric solutions of linear recurrence and q-recurrence equations. Basrah Journal of Science،Vol. 24, no. 1A, pp.21-33.
https://search.emarefa.net/detail/BIM-290254
Modern Language Association (MLA)
Sad, Husam Luti. M-hypergeometric solutions of linear recurrence and q-recurrence equations. Basrah Journal of Science Vol. 24, no. 1-A (2006), pp.21-33.
https://search.emarefa.net/detail/BIM-290254
American Medical Association (AMA)
Sad, Husam Luti. M-hypergeometric solutions of linear recurrence and q-recurrence equations. Basrah Journal of Science. 2006. Vol. 24, no. 1A, pp.21-33.
https://search.emarefa.net/detail/BIM-290254
Data Type
Journal Articles
Language
English
Notes
Includes bibliographical references : p. 33
Record ID
BIM-290254