A5016544440- Nonlinear Waves and Solitons
- Nonlinear Photonic Systems
- Fractional Differential Equations Solutions
- Gene Regulatory Network Analysis
- Aquaculture Nutrition and Growth
- Advanced Fiber Laser Technologies
- Nonlinear Differential Equations Analysis
- Differential Equations and Numerical Methods
- Bacterial Genetics and Biotechnology
- Fish Biology and Ecology Studies
- Dust and Plasma Wave Phenomena
- Algebraic structures and combinatorial models
- Ionosphere and magnetosphere dynamics
- Genomics and Chromatin Dynamics
- Numerical methods for differential equations
- Marine and fisheries research
- SARS-CoV-2 and COVID-19 Research
- Advanced Fluorescence Microscopy Techniques
- Differential Equations and Boundary Problems
- Advanced Mathematical Physics Problems
- Fixed Point Theorems Analysis
- Optimization and Variational Analysis
- Bioinformatics and Genomic Networks
- RNA and protein synthesis mechanisms
- Viral Infectious Diseases and Gene Expression in Insects
Khwaja Yunus Ali Medical College
2013-2024
Bangladesh Fisheries Research Institute
2005-2024
University of Rajshahi
2014-2024
University of Massachusetts Chan Medical School
2018-2024
Bangladesh Livestock Research Institute
2024
University of Southern Indiana
2023-2024
Gomal University
2024
National Institute of Cardiovascular Diseases
2016-2023
Indian Institute of Science Bangalore
2023
Los Alamos National Laboratory
2023
Abstract This research focuses on bifurcation analysis and new waveforms for the first fractional 3D Wazwaz–Benjamin–Bona–Mahony (WBBM) structure, which arises in shallow water waves. The linear stability technique is also employed to assess of mentioned model. suggested equation’s dynamical system obtained by applying Galilean transformation achieve our goal. Subsequently, bifurcation, chaos, sensitivity model are conducted principles planar system. We obtain periodic, quasi-periodic,...
This manuscript investigates bifurcation, chaos, and stability analysis for a significant model in the research of shallow water waves, known as second 3D fractional Wazwaz-Benjamin-Bona-Mahony (WBBM) model. The dynamical system above-mentioned nonlinear structure is obtained by employing Galilean transformation to fulfill objectives. Subsequent includes planar dynamic systems techniques investigate bifurcations, sensitivities within Our findings reveal diverse features, including...
This study presents novel waveforms and bifurcation analysis for the fractional Klein-Fock-Gordon (KFG) structure, which is widely used in particle condensed matter physics. To examine bifurcation, chaos, sensitivity of model, we derive dynamic system equation from Galilean transformation. We present explore a diverse range waveforms, including periodic waves, quasi-periodic bright dark solitons, kink anti-kink waves. Graphic diagrams simulations illustrate features existence these...
We apply the unified method to retrieve optical soliton solutions of Biswas–Arshed model (BAM) with Kerr law nonlinearity in this paper. first derive ordinary differential form from its partial via a variable transformation. Then we add many new dynamical solitons combo trigonometric, hyperbolic, and rational function by Maple-18 package literature. The derived exhibit some dynamics as singular exponentially increasing decreasing amplitudes, gradually constant amplitudes. Moreover, W-shaped...
The Zoomeron equation is used in various categories of soliton with unique characteristics that arise different physical phenomena, such as fluid dynamics, laser physics, and nonlinear optics. To achieve solutions for the structure, we apply unified, Kudryashov, improved Kudryashov techniques. We find periodic, breather, kink, anti-kink, dark-bell from derived optical solutions. Bright, dark, bright-dark breather waves are also established. Finally, some dynamic properties acquired findings...
The Zoomeron model is applied to various types of solitons arising in fluid mechanics, laser optics, and nonlinear physics. We derive analytical solutions the mentioned using exp(−λ(ς))-expansion, generalized Kudryashov, tanh schemes. obtain kink waves, breather bright soliton, dark soliton this via symbolic computation. also get both singular waves waves. dynamics adopted results are shown density 3D graphics. obtained outcomes will play a vital role further studies complicated models.
In this investigation, we apply the improved Kudryashov, novel and unified methods to demonstrate new wave behaviors of Fokas-Lenells nonlinear waveform arising in birefringent fibers. Through application these techniques, obtain numerous previously unreported dynamic optical soliton solutions mixed hyperbolic, trigonometric, rational forms governing model. These encompass periodic waves with W-shaped profiles, gradually increasing amplitudes, rapidly double-periodic waves, breather...
Biological systems must possess mechanisms that prevent inappropriate responses to spurious environmental inputs. Caenorhabditis elegans has two breakdown pathways for the short-chain fatty acid propionate: a canonical, vitamin B12-dependent pathway and propionate shunt is used when B12 levels are low. The kept off there sufficient flux through canonical pathway, likely avoid generating shunt-specific toxic intermediates. Here, we discovered transcriptional regulatory circuit activates gene...
In this manuscript, we consider a (3+1)-dimensional Sharma-Tasso-Olver-like (STOL) model, which can be used to describe dispersive wave phenomena in optics, plasmas, quantum physics, and others. Based on the simplified Hirota approach, n-soliton solutions are obtained. We observe that collisions non-elastic fusion or fission where some kink waves disappear due soliton fusion, single splits into more fusion. derive kinky-lump breather, combo line pair of breather degenerate from two-, three-...
We construct soliton solutions of the complex time fractional Schrodinger model (tFSM), as well space–time differential (stFDM), leading wave spread through electrical transmission lines (ETLM) in low pass with help modified simple equation scheme. The approach provides us generalized rational exponential function some free parameters. A few well-known solitary resolutions are derived, starting from selecting specific values constants. precise acquired via technique signify that scheme is...
Abstract We explore the dynamic characteristics of positron acoustic multiple-solitons in an unmagnetized plasma containing mobile cold positrons, Kappa-distributed superthermal hot electrons and stationary positive ions. This study investigates overtaking collisional effects, various parametric impacts, phase shifts electron–positron-ion (e-p-i) plasma. Through reductive perturbation technique, we derived Korteweg-de Vries (KdV) equation modified (mKdV) equation. The multiple-soliton...
This work retrieves polarized optical soliton solutions for pulses in birefringent fibers that are modeled by the Lakshmanan–Porsezian–Daniel model. The unified approach recovers singular solitons only. fails to retrieve much needed bright and dark solutions. These exist with restricted parametric conditions also exhibited.
We introduce a new integral scheme namely improved Kudryashov method for solving any nonlinear fractional differential model. Specifically, we apply the approach to space–time model leading wave spread in electrical transmission lines (s-tfETL), time complex Schrödinger (tfcS), and M-fractional Schrödinger–Hirota (s-tM-fSH) models verify effectiveness of proposed approach. The implementing introduced technique based on provides us with periodic envelope, exponentially changeable soliton...