The Experts below are selected from a list of 306 Experts worldwide ranked by ideXlab platform
Anjan Biswas - One of the best experts on this subject based on the ideXlab platform.
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optical soliton perturbation with complex ginzburg landau equation using Trial Solution approach
Optik, 2018Co-Authors: Anjan Biswas, Qin Zhou, Yakup Yildirim, Emrullah Yasar, Houria Triki, Ali Saleh Alshomrani, Malik Zaka Ullah, Seithuti P MoshokoaAbstract:Abstract This paper retrieves optical soliton Solution to the perturbed complex Ginzburg–Landau equation that is studied with nine different forms of nonlinearity. The Trial Solutions approach is the integration algorithm adopted in this paper. The perturbation terms appear with full nonlinearity to get a taste of generalized setting. Bright, dark and singular soliton Solutions are obtained. The existence criteria of such solitons are also presented.
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Optical soliton perturbation with complex Ginzburg–Landau equation using Trial Solution approach
Optik, 2018Co-Authors: Anjan Biswas, Qin Zhou, Yakup Yildirim, Emrullah Yasar, Houria Triki, Ali Saleh Alshomrani, Malik Zaka Ullah, Seithuti P Moshokoa, Milivoj BelicAbstract:Abstract This paper retrieves optical soliton Solution to the perturbed complex Ginzburg–Landau equation that is studied with nine different forms of nonlinearity. The Trial Solutions approach is the integration algorithm adopted in this paper. The perturbation terms appear with full nonlinearity to get a taste of generalized setting. Bright, dark and singular soliton Solutions are obtained. The existence criteria of such solitons are also presented.
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Optical solitons in nonlinear directional couplers with Trial function scheme
Nonlinear Dynamics, 2017Co-Authors: Ahmed H. Arnous, Mohammad Mirzazadeh, Qin Zhou, Houria Triki, Malik Zaka Ullah, Seithuti P Moshokoa, Anjan BiswasAbstract:This paper obtains bright, dark and singular soliton Solutions to optical couplers that appear with four forms of nonlinearity. Twin-core couplers as well as multiple-core couplers are considered. The Trial Solution approach is the integration algorithm adopted here. These Solutions appear with constraint conditions, also known as integrability criteria and they are listed.
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optical solitons with higher order dispersions in parabolic law medium by Trial Solution approach
Optik, 2016Co-Authors: Ahmed H. Arnous, Mohammad Mirzazadeh, Anjan Biswas, Qin Zhou, Seithuti P Moshokoa, Milivoj BelicAbstract:Abstract This paper obtains bright, dark and singular soliton Solutions in optical fibers with parabolic law nonlinearity in the presence of third and fourth order dispersions. The Trial Solutions approach is employed to carry out this integration. Besides solitons, periodic singular Solutions are also obtained as a byproduct. The corresponding constraint conditions are also listed.
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optical solitons in nano fibers with spatio temporal dispersion by Trial Solution method
Optik, 2016Co-Authors: Mostafa Eslami, Mohammad Mirzazadeh, Anjan Biswas, Qin Zhou, A H Bhrawy, Milivoj BelicAbstract:Abstract This paper utilizes Trial Solution algorithm to secure optical soliton Solutions to the nonlinear Schrodinger’s equation. Bright, dark and singular soliton Solutions are obtained to the model that is considered with four forms of nonlinearity. They are Kerr, power, parabolic and dual-power laws. There are constraint conditions that guarantee the existence of these solitons. Additionally, singular periodic Solutions are revealed as a by-product of this approach, and these are also listed.
Mohammad Mirzazadeh - One of the best experts on this subject based on the ideXlab platform.
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Optical solitons in nonlinear directional couplers with Trial function scheme
Nonlinear Dynamics, 2017Co-Authors: Ahmed H. Arnous, Mohammad Mirzazadeh, Qin Zhou, Houria Triki, Malik Zaka Ullah, Seithuti P Moshokoa, Anjan BiswasAbstract:This paper obtains bright, dark and singular soliton Solutions to optical couplers that appear with four forms of nonlinearity. Twin-core couplers as well as multiple-core couplers are considered. The Trial Solution approach is the integration algorithm adopted here. These Solutions appear with constraint conditions, also known as integrability criteria and they are listed.
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optical solitons with higher order dispersions in parabolic law medium by Trial Solution approach
Optik, 2016Co-Authors: Ahmed H. Arnous, Mohammad Mirzazadeh, Anjan Biswas, Qin Zhou, Seithuti P Moshokoa, Milivoj BelicAbstract:Abstract This paper obtains bright, dark and singular soliton Solutions in optical fibers with parabolic law nonlinearity in the presence of third and fourth order dispersions. The Trial Solutions approach is employed to carry out this integration. Besides solitons, periodic singular Solutions are also obtained as a byproduct. The corresponding constraint conditions are also listed.
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optical solitons in nano fibers with spatio temporal dispersion by Trial Solution method
Optik, 2016Co-Authors: Mostafa Eslami, Mohammad Mirzazadeh, Anjan Biswas, Qin Zhou, A H Bhrawy, Milivoj BelicAbstract:Abstract This paper utilizes Trial Solution algorithm to secure optical soliton Solutions to the nonlinear Schrodinger’s equation. Bright, dark and singular soliton Solutions are obtained to the model that is considered with four forms of nonlinearity. They are Kerr, power, parabolic and dual-power laws. There are constraint conditions that guarantee the existence of these solitons. Additionally, singular periodic Solutions are revealed as a by-product of this approach, and these are also listed.
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solitons and other Solutions to boussinesq equation with power law nonlinearity and dual dispersion
Nonlinear Dynamics, 2016Co-Authors: Mehmet Ekici, Mohammad Mirzazadeh, Mostafa EslamiAbstract:This paper addresses Boussinesq equation with power law nonlinearity and dual dispersion that is the study of water waves in Fluid Dynamics. Three integration algorithms retrieve solitons and other Solutions to model. The three integration algorithms applied are Trial Solution method, \(G^{\prime }{/}G\)-expansion approach as well as extended Trial equation method. The solitons are solitary waves, shock waves as well as singular. As a by-product, several other Solutions are listed from these integration schemes. These are singular periodic Solutions and plane waves. All of these Solutions have respective constraint relations that are needed for the Solution to hold.
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Soliton Solutions to resonant nonlinear Schrödinger’s equation with time-dependent coefficients by Trial Solution approach
Nonlinear Dynamics, 2015Co-Authors: Mohammad Mirzazadeh, Ahmed H. Arnous, Mohammad F. Mahmood, Essaid Zerrad, Anjan BiswasAbstract:In this paper, the resonant nonlinear Schrodinger’s equation is studied with four forms of nonlinearity and time-dependent coefficients. The Trial Solution method is employed to solve the governing equations. Solitons and singular periodic Solutions are obtained. The constraint conditions naturally emerge from the Solution structure that are needed for its existence.
S. Parameswaran - One of the best experts on this subject based on the ideXlab platform.
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ASP-DAC - Voltage reduction of application-specific heterogeneous multiprocessor systems for power minimisation
Proceedings of the 2000 conference on Asia South Pacific design automation - ASP-DAC '00, 2000Co-Authors: S. ParameswaranAbstract:We present a design strategy to reduce power demands in application-specific heterogeneous multiprocessor systems with interdependent subtasks. This power reduction scheme can be used with a randomised search such as a genetic algorithm where multiple Trial Solutions are tested. The scheme is applied to each Trial Solution after allocation and scheduling have been performed. Power savings are achieved by equally expanding each processor's execution time with a corresponding reduction in their respective operating voltage. Lowest cost Solutions achieve average reductions of 24% while minimum power Solutions average 58%.
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Voltage reduction of application-specific heterogeneous multiprocessor systems for power minimisation
Proceedings 2000. Design Automation Conference. (IEEE Cat. No.00CH37106), 2000Co-Authors: S. ParameswaranAbstract:We present a design strategy to reduce power demands in application-specific heterogeneous multiprocessor systems with interdependent subtasks. This power reduction scheme can be used with a randomised search such as a genetic algorithm where multiple Trial Solutions are tested. The scheme is applied to each Trial Solution after allocation and scheduling have been performed. Power savings are achieved by equally expanding each processor's execution time with a corresponding reduction in their respective operating voltage. Lowest cost Solutions achieve average reductions of 24% while minimum power Solutions average 58%.
Mostafa Eslami - One of the best experts on this subject based on the ideXlab platform.
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optical solitons in nano fibers with spatio temporal dispersion by Trial Solution method
Optik, 2016Co-Authors: Mostafa Eslami, Mohammad Mirzazadeh, Anjan Biswas, Qin Zhou, A H Bhrawy, Milivoj BelicAbstract:Abstract This paper utilizes Trial Solution algorithm to secure optical soliton Solutions to the nonlinear Schrodinger’s equation. Bright, dark and singular soliton Solutions are obtained to the model that is considered with four forms of nonlinearity. They are Kerr, power, parabolic and dual-power laws. There are constraint conditions that guarantee the existence of these solitons. Additionally, singular periodic Solutions are revealed as a by-product of this approach, and these are also listed.
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solitons and other Solutions to boussinesq equation with power law nonlinearity and dual dispersion
Nonlinear Dynamics, 2016Co-Authors: Mehmet Ekici, Mohammad Mirzazadeh, Mostafa EslamiAbstract:This paper addresses Boussinesq equation with power law nonlinearity and dual dispersion that is the study of water waves in Fluid Dynamics. Three integration algorithms retrieve solitons and other Solutions to model. The three integration algorithms applied are Trial Solution method, \(G^{\prime }{/}G\)-expansion approach as well as extended Trial equation method. The solitons are solitary waves, shock waves as well as singular. As a by-product, several other Solutions are listed from these integration schemes. These are singular periodic Solutions and plane waves. All of these Solutions have respective constraint relations that are needed for the Solution to hold.
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Trial Solution technique to chiral nonlinear Schrodinger’s equation in (1+2)-dimensions
Nonlinear Dynamics, 2016Co-Authors: Mostafa EslamiAbstract:This paper applied the Trial Solution technique to chiral nonlinear Schrodinger’s equation in (1\(+\)2)-dimensions. This led to solitons and other Solutions to the model. Besides soliton and singular soliton Solutions, this integration scheme also gave way to singular periodic Solutions.
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Trial Solution technique to chiral nonlinear schrodinger s equation in 1 2 dimensions
Nonlinear Dynamics, 2016Co-Authors: Mostafa EslamiAbstract:This paper applied the Trial Solution technique to chiral nonlinear Schrodinger’s equation in (1\(+\)2)-dimensions. This led to solitons and other Solutions to the model. Besides soliton and singular soliton Solutions, this integration scheme also gave way to singular periodic Solutions.
Ahmed H. Arnous - One of the best experts on this subject based on the ideXlab platform.
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Dynamics of optical solitons in dual-core fibers via two integration schemes
Superlattices and Microstructures, 2017Co-Authors: Ahmed H. Arnous, Syed Amer Mahmood, Muhammad YounisAbstract:Abstract This article studies the dynamics of optical solitons in dual-core fibers with group velocity mismatch, group velocity dispersion and linear coupling coefficient under Kerr law nonlinearity via two integration schemes, namely, Q-function scheme and Trial Solution approach. The Q-function scheme extracts dark and singular 1-soliton Solutions, along with the corresponding existence restriction. This scheme, however, fails to retrieve bright 1-soliton Solution. Moreover, the Trial Solution approach extracts bright, dark and singular 1-soliton Solutions. The constraint conditions, for the existence of the soliton Solutions, are also listed. Additionally, a couple of other Solutions known as singular periodic Solutions, fall out as a by-product of this scheme. The obtained results have potential applications in the study of solitons based optical communication.
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Optical solitons in nonlinear directional couplers with Trial function scheme
Nonlinear Dynamics, 2017Co-Authors: Ahmed H. Arnous, Mohammad Mirzazadeh, Qin Zhou, Houria Triki, Malik Zaka Ullah, Seithuti P Moshokoa, Anjan BiswasAbstract:This paper obtains bright, dark and singular soliton Solutions to optical couplers that appear with four forms of nonlinearity. Twin-core couplers as well as multiple-core couplers are considered. The Trial Solution approach is the integration algorithm adopted here. These Solutions appear with constraint conditions, also known as integrability criteria and they are listed.
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optical solitons with higher order dispersions in parabolic law medium by Trial Solution approach
Optik, 2016Co-Authors: Ahmed H. Arnous, Mohammad Mirzazadeh, Anjan Biswas, Qin Zhou, Seithuti P Moshokoa, Milivoj BelicAbstract:Abstract This paper obtains bright, dark and singular soliton Solutions in optical fibers with parabolic law nonlinearity in the presence of third and fourth order dispersions. The Trial Solutions approach is employed to carry out this integration. Besides solitons, periodic singular Solutions are also obtained as a byproduct. The corresponding constraint conditions are also listed.
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Soliton Solutions to resonant nonlinear Schrödinger’s equation with time-dependent coefficients by Trial Solution approach
Nonlinear Dynamics, 2015Co-Authors: Mohammad Mirzazadeh, Ahmed H. Arnous, Mohammad F. Mahmood, Essaid Zerrad, Anjan BiswasAbstract:In this paper, the resonant nonlinear Schrodinger’s equation is studied with four forms of nonlinearity and time-dependent coefficients. The Trial Solution method is employed to solve the governing equations. Solitons and singular periodic Solutions are obtained. The constraint conditions naturally emerge from the Solution structure that are needed for its existence.
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soliton Solutions to resonant nonlinear schrodinger s equation with time dependent coefficients by Trial Solution approach
Nonlinear Dynamics, 2015Co-Authors: Mohammad Mirzazadeh, Ahmed H. Arnous, Mohammad F. Mahmood, Essaid Zerrad, Anjan BiswasAbstract:In this paper, the resonant nonlinear Schrodinger’s equation is studied with four forms of nonlinearity and time-dependent coefficients. The Trial Solution method is employed to solve the governing equations. Solitons and singular periodic Solutions are obtained. The constraint conditions naturally emerge from the Solution structure that are needed for its existence.
