☆ 4.7 Article

A mathematical study unfolding the transmission and control of deadly Nipah virus infection under optimized preventive measures: New insights using fractional calculus

RESULTS IN PHYSICS (2023)

Related references

Note: Only part of the references are listed.

Article Mathematics, Applied

Fractional-order modeling and optimal control of a new online game addiction model based on real data

Youming Guo et al.

Summary: The spread of online games has become a serious problem that affects the healthy growth of young people and has potential harm to society. This paper develops a new fractional model of online game addiction and provides qualitative and quantitative analysis of the model. The results offer a new research idea for parameter estimation and a reliable result for controlling the spread of online games.

COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION (2023)

Add to Collection

Article Environmental Sciences

Assessing the environmental impact of industrial pollution using the complex intuitionistic fuzzy ELECTREE method: a case study of pollution control measures

Shahzaib Ashraf et al.

Summary: Environmental pollution is a pressing issue for the sustainable development of the planet, and industries have a significant impact on it. This paper introduces a novel approach, the complex intuitionistic fuzzy ELECTREE method (CIF-ELECTREE), for assessing the environmental impact of industries. The method combines CIF sets and the ELECTREE method to provide a comprehensive and reliable assessment. The results demonstrate the effectiveness of the CIF-ELECTREE method in controlling and reducing environmental impact, providing more accurate assessments compared to traditional methods.

FRONTIERS IN ENVIRONMENTAL SCIENCE (2023)

Add to Collection

Article Multidisciplinary Sciences

Mathematical analysis of heat and mass transfer on unsteady stagnation point flow of Riga plate with binary chemical reaction and thermal radiation effects

Umar Khan et al.

Summary: In order to prevent reaction explosions, chemical engineers and scientists analyze the kinetics and activation energies of chemical reactions involving binary chemical mixtures. Nanofluids with Arrhenius kinetics are important for various industrial uses. This study focuses on how thermal radiation affects heat and mass transfer during convective flow across a vertical plate with a binary chemical reaction. The mathematical model was solved using the Runge-Kutta method, and the results showed the effects of various factors on temperature, velocity, concentration, and skin friction. Comparisons with previous research confirmed the accuracy of the findings.

HELIYON (2023)

Add to Collection

Article Mathematical & Computational Biology

Analysis of Monkeypox viral infection with human to animal transmission via a fractional and Fractal-fractional operators with power law kernel

Alia M. Alzubaidi et al.

Summary: This article examines the dynamics of monkeypox transmission using a fractional mathematical model, incorporating human-to-animal transmission. The study applies fixed point theorems to establish the existence and uniqueness of the model's fractional and fractal-fractional problems. A numerical scheme is developed and simulations demonstrate the combined effect of fractal and fractional orders on the model's dynamics. The findings highlight the added biological insight provided by the new fractal-fractional operator.

MATHEMATICAL BIOSCIENCES AND ENGINEERING (2023)

Add to Collection

Article Materials Science, Multidisciplinary

A novel mechanism to simulate fractional order maize foliar disease dynamical model

Ajay Kumar et al.

Summary: This paper presents a mathematical model to examine the effects of foliar diseases on the dynamics of maize plants. The study utilizes a newly developed system of differential equations and fractional operators to describe maize foliar diseases. The stability of the system at the equilibrium point is determined through the calculation of the reproduction number, and the uniqueness and existence of solutions are investigated using the fixed point postulate. The sensitivity analysis of the model demonstrates its practical applicability.

RESULTS IN PHYSICS (2022)

Add to Collection

Article Mathematics, Interdisciplinary Applications

Optimal control of a fractional order model for the COVID-19 pandemic

Bashir Abdullahi Baba et al.

Summary: This study formulated a fractional optimal control problem for the outbreak of COVID-19 using a mathematical model with fractional order derivative, identifying effective strategies to reduce the spread through control measures. Numerical simulations demonstrated the significance of control functions in reducing exposure and infection rates in populations.

CHAOS SOLITONS & FRACTALS (2021)

Add to Collection

Article Physics, Multidisciplinary

A robust study on 2019-nCOV outbreaks through non-singular derivative

Muhammad Altaf Khan et al.

Summary: The world is still dealing with the second wave of the new coronavirus disease pandemic, exploring different approaches such as modeling, data analysis, and disease control to reduce infection. Researchers have proposed a new mathematical model to understand the dynamics and control of the disease, using fractional modeling to study the transmission and control of COVID-19.

EUROPEAN PHYSICAL JOURNAL PLUS (2021)

Add to Collection

Article Materials Science, Multidisciplinary

The extinction and persistence of a stochastic model of drinking alcohol

Anwarud Din et al.

Summary: This paper investigates the dynamical behavior of a stochastic model for drinking evolution, which consists of three compartments - susceptible population S, risk drinkers R, and moderate drinkers M. The study constructs and analyzes a Lyapunov function, examines the feasibility and positivity of the model's solution, and derives conditions for extinction and persistence through the Lyapunov function. The proposed model is tested using the RK4 method, showing strong convergence to the stochastic solution in both deterministic and stochastic simulations.

RESULTS IN PHYSICS (2021)

Add to Collection

Article Materials Science, Multidisciplinary

Stochastic optimal control analysis for the hepatitis B epidemic model

Peijiang Liu et al.

Summary: This paper focuses on the mathematical formulation of a stochastic HBV model with optimal control and randomly noise transmission. The model is divided into four classes perturbed by white noise. By applying optimal control techniques, both deterministic and stochastic models for control are investigated, with the numerical solution of the stochastic model based on the approximate solution method of the deterministic model. The simulation results of both models are compared against given data.

RESULTS IN PHYSICS (2021)

Add to Collection

Article Physics, Multidisciplinary

Modelling of transmission dynamics of Nipah virus (Niv): A fractional order Approach

Praveen Agarwal et al.

PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2020)

Add to Collection

Article Mathematics, Interdisciplinary Applications

An efficient algorithm for solving the fractional optimal control of SIRV epidemic model with a combination of vaccination and treatment

I Ameen et al.

CHAOS SOLITONS & FRACTALS (2020)

Add to Collection

Article Mathematics, Interdisciplinary Applications

A Novel 2-Stage Fractional Runge-Kutta Method for a Time-Fractional Logistic Growth Model

Muhammad Sarmad Arshad et al.

DISCRETE DYNAMICS IN NATURE AND SOCIETY (2020)

Add to Collection

Article Mathematics, Interdisciplinary Applications

Modeling the impact of non-pharmaceutical interventions on the dynamics of novel coronavirus with optimal control analysis with a case study

Saif Ullah et al.

CHAOS SOLITONS & FRACTALS (2020)

Add to Collection

Article Mathematics, Applied

A Mathematical Model for Nipah Virus Infection

Assefa Denekew Zewdie et al.

JOURNAL OF APPLIED MATHEMATICS (2020)

Add to Collection

Article Mathematics, Applied

Numerical investigations on COVID-19 model through singular and non-singular fractional operators

Sunil Kumar et al.

NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS (2020)

Add to Collection

Article Virology

Nipah virus: transmission of a zoonotic paramyxovirus

Bronwyn Anne Clayton

CURRENT OPINION IN VIROLOGY (2017)

Add to Collection

Article Public, Environmental & Occupational Health

Evolving epidemiology of Nipah virus infection in Bangladesh: evidence from outbreaks during 2010-2011

A. Chakraborty et al.

EPIDEMIOLOGY AND INFECTION (2016)

Add to Collection

Article Mathematics, Applied

A new approach to the Pontryagin maximum principle for nonlinear fractional optimal control problems

Hegagi M. Ali et al.

MATHEMATICAL METHODS IN THE APPLIED SCIENCES (2016)

Add to Collection

Article Pharmacology & Pharmacy

The pandemic potential of Nipah virus

Stephen P. Luby

ANTIVIRAL RESEARCH (2013)

Add to Collection

Article Biology

Determining important parameters in the spread of malaria through the sensitivity analysis of a mathematical model

Nakul Chitnis et al.

BULLETIN OF MATHEMATICAL BIOLOGY (2008)

Add to Collection

Article Biology

Reproduction numbers and sub-threshold endemic equilibria for compartmental models of disease transmission

P van den Driessche et al.

MATHEMATICAL BIOSCIENCES (2002)

Add to Collection

Article Multidisciplinary Sciences

Nipah virus: A recently emergent deadly paramyxovirus

KB Chua et al.

SCIENCE (2000)

Add to Collection

© Peeref 2019-2024. All rights reserved.