Analysis of a queue with joining strategy and interruption repeat or resumption of service
Dhanya
Shajin
Department of Mathematics, Sree Narayana College, Chempazhanthy, Thiruvananthapuram Kerala-695587, India.
author
text
article
2019
eng
Consider an $M/M/1$ queueing system with service interruption. If the server is busy at the arrival epoch, the arriving customer decides to join the queue with probability $q$ and balk with probability $1-q$. The service is assumed to get interrupted according to a Poisson process. The interrupted service is either resumed or restarted according to the realization of two competing independent, non-identically distributed random variables, the realization times of which follow exponential distributions. An arriving customer, finding the server under interruption does not join the system. We analyze the Nash equilibrium customers' joining strategies and give some numerical examples.
Journal of Mathematical Modeling
University of Guilan
2345-394X
7
v.
2
no.
2019
153
174
https://jmm.guilan.ac.ir/article_3383_65c2f30366e54d2a2db025ad412ffc30.pdf
dx.doi.org/10.22124/jmm.2019.11467.1194
Interplay of resource distributions and diffusion strategies for spatially heterogeneous populations
Md.
Kamrujjaman
Department of Mathematics, University of Dhaka, Dhaka 1000, Bangladesh
author
text
article
2019
eng
In this paper, we consider a reaction-diffusion competition model describing the interactions between two species in a heterogeneous environment. Specifically, we study the impact of diffusion strategies on the outcome of competition between two populations while the species are distributed according to their respective carrying capacities. The two species differ in the diffusion strategies they employ as well as in their asymmetric growth intensities. In case of weak competition, both populations manage to coexist and there is an ideal free pair. If the resources are shared partially then one species emerge as the sole winner and the other goes extinct. The results have been verified and illustrated numerically.
Journal of Mathematical Modeling
University of Guilan
2345-394X
7
v.
2
no.
2019
175
198
https://jmm.guilan.ac.ir/article_3384_acbe97790982ae5ee4783041b00ecf78.pdf
dx.doi.org/10.22124/jmm.2019.11734.1208
Partial eigenvalue assignment for stabilization of descriptor fractional discrete-time linear systems
Sakineh
Mirassadi
Faculty of Mathematical sciences, Shahrood University of Technology, Shahrood, Iran
author
Hojjat
Ahsani Tehrani
Faculty of Mathematical sciences, Shahrood University of Technology, Shahrood, Iran
author
text
article
2019
eng
In this article, a method by partial eigenvalue assignment for stabilization of descriptor fractional discrete-time linear system is presented. This system can be converted to standard descriptor system by definition of fractional-order derivative and considering a new state vector. Using forward and propositional state feedback we do not need to have a full rank open-loop matrix in this kind of systems. However, only a part of the open-loop spectrum which are not in stability region need to be reassigned while keeping all the other eigenvalues invariant. Using partial eigenvalue assignment, size of matrices are decreased while the stability is preserved. Finally, two methods of partial eigenvalue assignment are compared.
Journal of Mathematical Modeling
University of Guilan
2345-394X
7
v.
2
no.
2019
199
220
https://jmm.guilan.ac.ir/article_3402_aad8d49cd38f646f5af696c0b9ffb2e6.pdf
dx.doi.org/10.22124/jmm.2019.11810.1210
On some applicable approximations of Gaussian type integrals
Christophe
Chesneau
LMNO, University of Caen, Caen, France
author
Fabien
Navarro
CREST, ENSAI, Rennes, France
author
text
article
2019
eng
In this paper, we introduce new applicable approximations for Gaussian type integrals. A key ingredient is the approximation of the function $e^{-x^2}$ by the sum of three simple polynomial-exponential functions. Five special Gaussian type integrals are then considered as applications. Approximation of the so-called Voigt error function is investigated.
Journal of Mathematical Modeling
University of Guilan
2345-394X
7
v.
2
no.
2019
221
229
https://jmm.guilan.ac.ir/article_3403_866110e222286534f422eb718844a4af.pdf
dx.doi.org/10.22124/jmm.2019.12897.1250
Solving the general form of the Emden-Fowler equations with the Moving Least Squares method
Sasan
Asadpour
Department of Mathematics, University of Mazandaran, Babolsar, Iran
author
AllahBakhsh
Yazdani Cherati
Department of Mathematics, University of Mazandaran, Babolsar, Iran
author
Hassan
Hosseinzadeh
Department of Mathematics, University of Mazandaran, Babolsar, Iran
author
text
article
2019
eng
In the present paper, we have used moving least squares (MLS) method to solve the integral form of the Emden-Fowler equations with initial conditions. The Volterra integral form of the Emden-Fowler equations overcomes their singular behavior at $x=0$, and the MLS method leads to a satisfactory solution for the equation. The convergence of the method is investigated and finally its applicability is displayed through numerical examples.
Journal of Mathematical Modeling
University of Guilan
2345-394X
7
v.
2
no.
2019
231
250
https://jmm.guilan.ac.ir/article_3412_61805cba8ea61e4b3f2f3f1e4a50207d.pdf
dx.doi.org/10.22124/jmm.2019.12623.1238
On nilpotent interval matrices
Effat
Golpar raboky
Faculty of Mathematical Sciences, University of Qom, Qom, Iran
author
Tahereh
Eftekhari
School of Mathematics, Iran University of Science & Technology, Tehran , Iran
author
text
article
2019
eng
In this paper, we give a necessary and sufficient condition for the powers of an interval matrix to be nilpotent. We show an interval matrix $\it{\bf{A}}$ is nilpotent if and only if $ \rho(\mathscr{B})=0 $, where $\mathop{\mathscr{B}} $ is a point matrix, introduced by Mayer (Linear Algebra Appl. 58 (1984) 201-216), constructed by the $ (*) $ property. We observed that the spectral radius, determinant, and trace of a nilpotent interval matrix equal zero but in general its converse is not true. Some properties of nonnegative nilpotent interval matrices are derived. We also show that an irreducible interval matrix $\bf{A}$ is nilpotent if and only if $ | \bf{A} | $ is nilpotent.
Journal of Mathematical Modeling
University of Guilan
2345-394X
7
v.
2
no.
2019
251
261
https://jmm.guilan.ac.ir/article_3425_4cca7cd4f1cbbaceb4cc579d613cfc45.pdf
dx.doi.org/10.22124/jmm.2019.12669.1239