A discrete adomian decomposition method for discrete nonlinear schroedinger equations

dc.contributor.author	Μπράτσος, Αθανάσιος Γ.	el
dc.contributor.author	Ehrhardt, Matthias	en
dc.contributor.author	Φαμέλης, Ιωάννης Θ.	el
dc.date.accessioned	2015-02-14T09:37:24Z
dc.date.available	2015-02-14T09:37:24Z
dc.date.issued	2015-02-14
dc.identifier.uri	http://hdl.handle.net/11400/6195
dc.rights	Αναφορά Δημιουργού-Μη Εμπορική Χρήση-Όχι Παράγωγα Έργα 3.0 Ηνωμένες Πολιτείες	*
dc.rights.uri	http://creativecommons.org/licenses/by-nc-nd/3.0/us/	*
dc.source	http://www.elsevier.com	en
dc.subject	Mathematica (Computer program language)
dc.subject	Solitons
dc.subject	Μαθηματικά
dc.subject	Σολιτόνια
dc.title	A discrete adomian decomposition method for discrete nonlinear schroedinger equations	en
heal.type	journalArticle
heal.classification	Mathematics
heal.classification	Applied mathematics
heal.classification	Μαθηματικά
heal.classification	Εφαρμοσμένα μαθηματικά
heal.classificationURI	http://id.loc.gov/authorities/subjects/sh85082139
heal.classificationURI	http://id.loc.gov/authorities/subjects/sh93002523
heal.classificationURI	N/A-Μαθηματικά
heal.classificationURI	N/A-Εφαρμοσμένα μαθηματικά
heal.keywordURI	http://id.loc.gov/authorities/subjects/sh93005423
heal.keywordURI	http://id.loc.gov/authorities/subjects/sh85124672
heal.identifier.secondary	doi:10.1016/j.amc.2007.07.055
heal.language	en
heal.access	campus
heal.recordProvider	Τ.Ε.Ι. Αθήνας. Σχολή Τεχνολογικών Εφαρμογών. Τμήμα Ηλεκτρονικών Μηχανικών Τ.Ε.	el
heal.publicationDate	2008
heal.bibliographicCitation	Bratsos, A., Ehrhardt, M. and Famelis, I. (March 2008). A discrete adomian decomposition method for discrete nonlinear schroedinger equations. Applied Mathematics and Computation. 197(1). pp 190-205. Elsevier Science Ltd: 2008. Available from: http://www.sciencedirect.com [Accessed 02/08/2007]	en
heal.abstract	We present a new discrete Adomian decomposition method to approximate the theoretical solution of discrete nonlinear Schrödinger equations. The method is examined for plane waves and for single soliton waves in case of continuous, semi-discrete and fully discrete Schrödinger equations. Several illustrative examples and Mathematica program codes are presented.	en
heal.publisher	Elsevier Science Ltd	en
heal.journalName	Applied Mathematics and Computation	en
heal.journalType	peer-reviewed
heal.fullTextAvailability	true