Showing total 5 results

1. Analysis of the stochastic model for predicting the novel coronavirus disease

Author

Ndolane Sene

Subjects

Equilibrium point, 2019-20 coronavirus outbreak, Algebra and Number Theory, Partial differential equation, Coronavirus disease 2019 (COVID-19), Novel coronavirus, Stochastic modelling, Applied Mathematics, Severe acute respiratory syndrome coronavirus 2 (SARS-CoV-2), lcsh:Mathematics, Research, Equilibrium points, medicine.disease_cause, lcsh:QA1-939, 01 natural sciences, 010305 fluids & plasmas, Ordinary differential equation, Stochastic numerical scheme, 0103 physical sciences, medicine, Applied mathematics, 010306 general physics, Analysis, Coronavirus, Mathematics

Abstract

In this paper, we propose a mathematical model to predict the novel coronavirus. Due to the rapid spread of the novel coronavirus disease in the world, we add to the deterministic model of the coronavirus the terms of the stochastic perturbations. In other words, we consider in this paper a stochastic model to predict the novel coronavirus. The equilibrium points of the deterministic model have been determined, and the reproduction number of our deterministic model has been implemented. The asymptotic behaviors of the solutions of the stochastic model around the equilibrium points have been studied. The numerical investigations and the graphical representations obtained with the novel stochastic model are made using the classical stochastic numerical scheme.

Published

2020

2. Fractional optimal control of COVID-19 pandemic model with generalized Mittag-Leffler function

Author

Anwar Saeed, Usa Humphries, Amir Khan, Taza Gul, Ali Akgül, and Rahat Zarin

Subjects

Equilibrium point, Mittag-Leffler function, Algebra and Number Theory, Partial differential equation, Applied Mathematics, Research, Stability (learning theory), Stability analysis, Optimal control, symbols.namesake, Ordinary differential equation, QA1-939, symbols, Numerical simulations, Applied mathematics, Uniqueness, Pandemic model, Epidemic model, Sensitivity analysis, Mathematics, Analysis

Abstract

In this paper, we consider a fractional COVID-19 epidemic model with a convex incidence rate. The Atangana–Baleanu fractional operator in the Caputo sense is taken into account. We establish the equilibrium points, basic reproduction number, and local stability at both the equilibrium points. The existence and uniqueness of the solution are proved by using Banach and Leray–Schauder alternative type theorems. For the fractional numerical simulations, we use the Toufik–Atangana scheme. Optimal control analysis is carried out to minimize the infection and maximize the susceptible people.

Published

2021

3. Uniqueness of the Hadamard-type integral equations

Author

Chenkuan Li

Subjects

Pure mathematics, Banach space, 01 natural sciences, Hadamard transform, Banach’s fixed point theorem, Uniqueness, 0101 mathematics, Mathematics, Hadamard-type integral, Mathematics::Functional Analysis, Algebra and Number Theory, Partial differential equation, Functional analysis, lcsh:Mathematics, Applied Mathematics, Research, 010102 general mathematics, lcsh:QA1-939, Integral equation, 34A12, 010101 applied mathematics, Ordinary differential equation, Babenko’s approach, Contraction principle, 26A33, Multivariate Mittag-Leffler function, Analysis, 45E10

Abstract

The goal of this paper is to study the uniqueness of solutions of several Hadamard-type integral equations and a related coupled system in Banach spaces. The results obtained are new and based on Babenko’s approach and Banach’s contraction principle. We also present several examples for illustration of the main theorems.

Published

2021

4. A numerical solution by alternative Legendre polynomials on a model for novel coronavirus (COVID-19)

Author

Mohammad Ali Ebadi and E. Hashemizadeh

Subjects

Coronavirus disease 2019 (COVID-19), 02 engineering and technology, medicine.disease_cause, 01 natural sciences, Operational matrix of derivative, 010305 fluids & plasmas, Collocation method, 0103 physical sciences, 0202 electrical engineering, electronic engineering, information engineering, medicine, Applied mathematics, Algebraic number, Legendre polynomials, Mathematics, Coronavirus, Algebra and Number Theory, Partial differential equation, Applied Mathematics, lcsh:Mathematics, Research, Alternative Legendre polynomials, COVID-19, lcsh:QA1-939, System of differential equations, Ordinary differential equation, 020201 artificial intelligence & image processing, Analysis

Abstract

Coronavirus disease (COVID-19) is an infectious disease caused by a newly discovered coronavirus. This paper provides a numerical solution for the mathematical model of the novel coronavirus by the application of alternative Legendre polynomials to find the transmissibility of COVID-19. The mathematical model of the present problem is a system of differential equations. The goal is to convert this system to an algebraic system by use of the useful property of alternative Legendre polynomials and collocation method that can be solved easily. We compare the results of this method with those of the Runge–Kutta method to show the efficiency of the proposed method.

Published

2020

5. Analysis of an improved fractional-order model of boundary formation in the Drosophila large intestine dependent on Delta-Notch pathway

Author

Lingyun Lu, Fei Liu, Daping Wang, Li Duan, Deshun Sun, and Xiong Jianyi

Subjects

Local stability analysis, Algebra and Number Theory, Partial differential equation, Fractional-order differential equations, Differential equation, lcsh:Mathematics, Applied Mathematics, Research, 010102 general mathematics, Expression (computer science), lcsh:QA1-939, Delta-Notch signaling pathway, 01 natural sciences, Stability (probability), 010101 applied mathematics, Sensitive analysis, Exponential stability, Ordinary differential equation, Applied mathematics, Uniqueness, Sensitivity (control systems), 0101 mathematics, Analysis, Mathematics

Abstract

In this paper, an improved fractional-order model of boundary formation in the Drosophila large intestine dependent on Delta-Notch pathway is proposed for the first time. The uniqueness, nonnegativity, and boundedness of solutions are studied. In a two cells model, there are two equilibriums (no-expression of Delta and normal expression of Delta). Local asymptotic stability is proved for both cases. Stability analysis shows that the orders of the fractional-order differential equation model can significantly affect the equilibriums in the two cells model. Numerical simulations are presented to illustrate the conclusions. Next, the sensitivity of model parameters is calculated, and the calculation results show that different parameters have different sensitivities. The most and least sensitive parameters in the two cells model and the 60 cells model are verified by numerical simulations. What is more, we compare the fractional-order model with the integer-order model by simulations, and the results show that the orders can significantly affect the dynamic and the phenotypes.

Published

2020