A5003756884- Mathematical and Theoretical Epidemiology and Ecology Models
- Fractional Differential Equations Solutions
- Nonlinear Differential Equations Analysis
- COVID-19 epidemiological studies
- Differential Equations and Numerical Methods
- Evolution and Genetic Dynamics
- Differential Equations and Boundary Problems
- SARS-CoV-2 and COVID-19 Research
- COVID-19 diagnosis using AI
- Mosquito-borne diseases and control
- Water Quality Monitoring and Analysis
- Animal Virus Infections Studies
- stochastic dynamics and bifurcation
- Insect symbiosis and bacterial influences
- Plant Parasitism and Resistance
- Mental Health Research Topics
- Digital Imaging for Blood Diseases
- Nonlinear Dynamics and Pattern Formation
- Fixed Point Theorems Analysis
- Evolutionary Game Theory and Cooperation
- Neural dynamics and brain function
- Advanced Differential Equations and Dynamical Systems
- Corruption and Economic Development
- Plant Virus Research Studies
- Viral Infections and Vectors
Phuket Rajabhat University
2024-2025
Seoul National University
2024-2025
Alagappa University
2021-2024
Mahatma Gandhi University
2023-2024
Dong Thap University
2023
The primary objective of the current study was to create a mathematical model utilizing fractional-order calculus for purpose analyzing symmetrical characteristics Wolbachia dissemination among Aedesaegypti mosquitoes. We investigated various strains determine most sustainable one through predicting their dynamics. is an effective tool controlling mosquito-borne diseases, and several have been tested in laboratories released into outbreak locations. This aimed features efficient strain from...
A mathematical model of an interaction between two populations namely prey and predator is studied based on a Gause-type predator–prey involving the additive Allee effect intraspecific competition predator. famous fractional operator called Atangana–Baleanu–Caputo derivative (ABC) employed to integrate impact memory dynamical behavior model. The existence, uniqueness, non-negativity, boundedness solution are given confirm biological feasibility validity Three types equilibrium points...
Abstract The asymptotic behavior of four integrated pest management models with stage structure is analyzed in this article. Stage structuring suggested because almost all pests pass through two stages their lives, namely immature larvae and mature adults. It believed that susceptible exposed are targeted by a natural enemy infected make them contacted (immature mature). After fixed times, pests, enemies infused impulsively. And we have also the effects nontarget here. stability analysis...
This research introduces a sophisticated mathematical model for understanding the transmission dynamics of COVID-19, incorporating both integer and fractional derivatives. The undergoes rigorous analysis, examining equilibrium points, reproduction number, feasibility. application fixed point theory establishes existence unique solution, demonstrating stability in model. To derive approximate solutions, generalized Adams-Bashforth-Moulton method is employed, further enhancing study's...
Considering the prevailing situations, mathematical modeling and dynamics of novel coronavirus (2019-nCoV) particularly in India are studied this paper. The goal work is to create an effective SEIRS model study about epidemic. Four different models considered solved paper using efficient homotopy perturbation method. A clear picture disease spreading can be obtained from solutions derived We parametrized by considering number infection cases 1 April 2020 30 June 2020. Finally, numerical...
In this paper, the ABC fractional derivative is used to provide a mathematical model for dynamic systems of substance addiction. The basic reproduction number investigated, as well equilibrium points' stability. Using fixed point theory and nonlinear analytic techniques, we verify theoretical results solution existence uniqueness proposed model. A numerical technique getting approximate suggested established by using Adams type predictor‐corrector rule ABC‐fractional integral operator. There...
In this paper, we investigate existence, uniqueness and four different types of Ulam’s stability, that is, Ulam-Hyers generalized Ulam-Hyers- Rassias stability Ulam-Hyers-Rassias the solution for a class nonlinear fractional Pantograph differential equation in term proportional Caputo derivative with mixed nonlocal conditions. We construct sufficient conditions existence solutions by utilizing well-known classical fixed point theorems such as Banach contraction principle, Leray-Schauder...
Substance addiction such as tobacco, alcohol, opioids, drug and so on are increasing day by day. Awareness about the harmful effects of substance health strong will power people to get rid have positive impact controlling addiction. The aim this research is examine awareness determination, two cognitive factors that greater in preventing Addiction adversely affects self‐efficacy younger generation, thought processing, metabolisms human body, psychosocial cardiovascular diseases. In paper, we...
We established a mathematical model based on the sense of biological survey in field agriculture and introduced various control methods how to prevent crops from destructive pests. Basically, there are two main stages life cycle natural enemies like insects: mature immature. Here, we construct food chain plant pest enemy. In enemies, construction. Also, consider three classes diseases population, namely, susceptible, exposed, infectious this proposed work. order categorize considered models...
International Journal of Computer Sciences and Engineering (A UGC Approved indexed with DOI, ICI Approved, DPI Digital Library) is one the leading growing open access, peer-reviewed, monthly, scientific research journal for scientists, engineers, scholars, academicians, which gains a foothold in Asia opens to world, aims publish original, theoretical practical advances Science,Information Technology, (Software, Mechanical, Civil, Electronics & Electrical), all interdisciplinary streams...