Strongly localized modes in binary discrete media with cubic-quintic nonlinearity : an anti-continuum approach /

This study is aim to investigate the existence and stability of strongly localized modes (SLMs) in binary discrete media with cubic-quintic nonlinearity described by two-component cubic-quintic discrete nonlinear Schrödinger equations (CQDNLSEs). The existence of the solutions are demonstrated by so...

Full description

Saved in:
Bibliographic Details
Main Author: Lukhman bin Abdul Taib (Author)
Format: Thesis
Language:English
Published: Kuantan, Pahang : Kulliyyah of Science, International Islamic University Malaysia, 2018
Subjects:
Online Access:Click here to view 1st 24 pages of the thesis. Members can view fulltext at the specified PCs in the library.
Tags: Add Tag
No Tags, Be the first to tag this record!
LEADER 032810000a22003010004500
008 180717s2018 my a f m 000 0 eng d
040 |a UIAM  |b eng  |e rda 
041 |a eng 
043 |a a-my--- 
050 0 0 |a QC174.26.W28 
100 0 |a Lukhman bin Abdul Taib,  |e author 
245 1 0 |a Strongly localized modes in binary discrete media with cubic-quintic nonlinearity :  |b an anti-continuum approach /  |c by Lukhman bin Abdul Taib 
264 1 |a Kuantan, Pahang :  |b Kulliyyah of Science, International Islamic University Malaysia,  |c 2018 
300 |a xix, 123 leaves :  |b colour illustrations ;  |c 30cm. 
336 |2 rdacontent  |a text 
347 |2 rdaft  |a text file  |b PDF 
502 |a Thesis (MSCTS)--International Islamic University Malaysia, 2018. 
504 |a Includes bibliographical references (leaves 106-108). 
520 |a This study is aim to investigate the existence and stability of strongly localized modes (SLMs) in binary discrete media with cubic-quintic nonlinearity described by two-component cubic-quintic discrete nonlinear Schrödinger equations (CQDNLSEs). The existence of the solutions are demonstrated by solving the steady state equations of the model, while their stability are shown by using the standard linearization ansatz. The space-time evolution of the solutions are executed by performing direct numerical integrations of the coupled CQDNLSEs. In the first part, we derive analytical expressions essential for the existence of bright SLMs. New family of SLMs are introduced too, namely the symbiotic even-odd bright modes. Stability analysis showed that quintic nonlinearity yields effect on the instability of odd anti-symmetric and shifted bright modes. Meanwhile for even bright SLMs, solutions that are in the bound state of odd modes or in the state of out-of-phase tend to become stable. In the second part, we perform the derivation of analytical expressions for dark modes. We found that stability of odd and even dark modes confirm the results on modulational stability region identified by Baizakov et al. (2009), but the symbiotic dark SLMs are not constrained by it. For odd and even dark modes, instability of the solutions give rise to localized states. The existence of symbiotic dark–anti-dark modes are restricted to a small range of parameters. For symbiotic bright-dark SLMs, modes with even structure are shown to be unstable compared to odd feature. 
596 |a 1 6 
655 7 |a Theses, IIUM local 
690 |a Dissertations, Academic  |x Department of Computational and Theoretical Sciences  |z IIUM 
710 2 |a International Islamic University Malaysia.  |b Department of Computational and Theoritical Sciences 
856 4 |u https://lib.iium.edu.my/mom/services/mom/document/getFile/PVPrFyilEEZ3LG9GnU9V9mQYElXcroS920200109153815096  |z Click here to view 1st 24 pages of the thesis. Members can view fulltext at the specified PCs in the library. 
900 |a sbh-aaz 
999 |c 440402  |d 471154 
952 |0 0  |6 T QC 000174.26 W28 L954S 2018  |7 0  |8 THESES  |9 762974  |a KIMC  |b KIMC  |c CLOSEACCES  |g 0.00  |o t QC 174.26 W28 L954S 2018  |p 11100406863  |r 2020-08-07  |t 1  |v 0.00  |y THESIS 
952 |0 0  |6 TS CDF QC 174.26 W28 L954S 2018  |7 0  |8 THESES  |9 857394  |a IIUM  |b IIUM  |c MULTIMEDIA  |g 0.00  |o ts cdf QC 174.26 W28 L954S 2018  |p 11100406864  |r 2020-08-07  |t 1  |v 0.00  |y THESISDIG