@Article{Shahi2017,
author="Shahi, Samaneh
and Kheiri, Hossein",
title="Effects of ionic parameters on behavior of a skeletal muscle fiber model",
journal="Journal of Mathematical Modeling",
year="2017",
volume="5",
number="2",
pages="77-88",
abstract="All living cells have a membrane which separates inside the cell from it's outside. There is a potential difference between inside and outside of the cell. This potential difference will change during an action potential. It is quite common to peruse action potentials of skeletal muscle fibers with the Hodgkin-Huxley model. Since Hodgkin and Huxley summarized some controlling currents like inward rectifier current or chloride current as a leak current when we try to study the sensitivity of model to some parameters we lose some details. In this paper we use a model which contains sodium, potassium, chloride, Na-K pump, and inward rectifier currents. Firstly, we find critical point of the system, and discuss on how action potential changes for different initial values of variables. Then we study sensitivity of the critical point and maximum of potential to different parameters.",
issn="2345-394X",
doi="10.22124/jmm.2017.2343",
url="https://jmm.guilan.ac.ir/article_2343.html"
}
@Article{Shesha2017,
author="Shesha, Sumana R
and Nargund, Achala L.
and Bujurke, Nagendrappa M.",
title="Numerical solution of non-planar Burgers equation by Haar wavelet method",
journal="Journal of Mathematical Modeling",
year="2017",
volume="5",
number="2",
pages="89-118",
abstract="In this paper, an efficient numerical scheme based on uniform Haar wavelets is used to solve the non-planar Burgers equation. The quasilinearization technique is used to conveniently handle the nonlinear terms in the non-planar Burgers equation. The basic idea of Haar wavelet collocation method is to convert the partial differential equation into a system of algebraic equations that involves a finite number of variables. The solution obtained by Haar wavelet collocation method is compared with that obtained by finite difference method and are found to be in good agreement. Shock waves are found to be formed due to nonlinearity and dissipation. We have analyzed the effects of non-planar and nonlinear geometry on shock existence. We observe that non-planar shock structures are different from planar ones. It is of interest to find that Haar wavelets enable to predict the shock structure accurately.",
issn="2345-394X",
doi="10.22124/jmm.2017.2460",
url="https://jmm.guilan.ac.ir/article_2460.html"
}
@Article{Muniyagounder2017,
author="Muniyagounder, Sambath
and Sahadevan, Ramajayam",
title="Hopf bifurcation analysis of a diffusive predator-prey model with Monod-Haldane response",
journal="Journal of Mathematical Modeling",
year="2017",
volume="5",
number="2",
pages="119-136",
abstract="In this paper, we have studied the diffusive predator-prey model with Monod-Haldane functional response. The stability of the positive equilibrium and the existence of Hopf bifurcation are investigated by analyzing the distribution of eigenvalues without diffusion. We also study the spatially homogeneous and non-homogeneous periodic solutions through all parameters of the system which are spatially homogeneous. In order to verify our theoretical results, some numerical simulations are also presented.",
issn="2345-394X",
doi="10.22124/jmm.2017.2482",
url="https://jmm.guilan.ac.ir/article_2482.html"
}
@Article{Tumwiine2017,
author="Tumwiine, Julius
and Robert, Godwin",
title="A mathematical model for treatment of bovine brucellosis in cattle population",
journal="Journal of Mathematical Modeling",
year="2017",
volume="5",
number="2",
pages="137-152",
abstract="Brucellosis is an infectious bacterial zoonosis of public health and economic significance. In this paper, a mathematical model describing the propagation of bovine brucellosis within cattle population is formulated. Model analysis is carried out to obtain and establish the stability of the equilibrium points. A threshold parameter referred to as the basic reproduction number $\mathcal{R}_{0}$ is calculated and the conditions under which bovine brucellosis can be cleared in the cattle population are established. It is found out that when $\mathcal{R}_{0}<1,$ the disease can be eliminated in the cattle population or persists when $\mathcal{R}_{0}>1$. Using Lyapunov function and Poincair\'{e}-Bendixson theory, we prove that the disease-free and endemic equilibrium, respectively are globally asymptotic stable. Numerical simulation reveals that control measures should aim at reducing the magnitude of the parameters for contact rate of infectious cattle with the susceptible and recovered cattle, and increasing treatment rate of infected cattle.",
issn="2345-394X",
doi="10.22124/jmm.2017.2523",
url="https://jmm.guilan.ac.ir/article_2523.html"
}
@Article{Abdo2017,
author="Abdo, Mohammed Salem
and Panchal, Satish Kushaba",
title="Existence and continuous dependence for fractional neutral functional differential equations",
journal="Journal of Mathematical Modeling",
year="2017",
volume="5",
number="2",
pages="153-170",
abstract="In this paper, we investigate the existence, uniqueness and continuous dependence of solutions of fractional neutral functional differential equations with infinite delay and the Caputo fractional derivative order, by means of the Banach's contraction principle and the Schauder's fixed point theorem.",
issn="2345-394X",
doi="10.22124/jmm.2017.2535",
url="https://jmm.guilan.ac.ir/article_2535.html"
}
@Article{Fathi-Hafshejani2017,
author="Fathi-Hafshejani, Sajad
and Mansouri, Hossein
and Peyghami, Mohammad Reza",
title="An interior-point algorithm for $P_{\ast}(\kappa)$-linear complementarity problem based on a new trigonometric kernel function",
journal="Journal of Mathematical Modeling",
year="2017",
volume="5",
number="2",
pages="171-197",
abstract="In this paper, an interior-point algorithm for $P_{\ast}(\kappa)$-Linear Complementarity Problem (LCP) based on a new parametric trigonometric kernel function is proposed. By applying strictly feasible starting point condition and using some simple analysis tools, we prove that our algorithm has $O((1+2\kappa)\sqrt{n} \log n\log\frac{n}{\epsilon})$ iteration bound for large-update methods, which coincides with the best known complexity bound. Moreover, numerical results confirm that our new proposed kernel function is doing well in practice in comparison with some existing kernel functions in the literature.",
issn="2345-394X",
doi="10.22124/jmm.2017.2537",
url="https://jmm.guilan.ac.ir/article_2537.html"
}