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Mathematical models of single population. / Kolpak, Eugeny Petrovich; Stolbovaia, Mariia Vladimirovna; Frantsuzova, Inna Sergeevna.

In: Global Journal of Pure and Applied Mathematics, Vol. 12, No. 4, 01.01.2016, p. 3609-3619.

Research output: Contribution to journal › Article › peer-review

Harvard

Kolpak, EP, Stolbovaia, MV & Frantsuzova, IS 2016, 'Mathematical models of single population', Global Journal of Pure and Applied Mathematics, vol. 12, no. 4, pp. 3609-3619. <https://www.ripublication.com/gjpam16/gjpamv12n4_71.pdf>

APA

Kolpak, E. P., Stolbovaia, M. V., & Frantsuzova, I. S. (2016). Mathematical models of single population. Global Journal of Pure and Applied Mathematics, 12(4), 3609-3619. https://www.ripublication.com/gjpam16/gjpamv12n4_71.pdf

Vancouver

Kolpak EP, Stolbovaia MV, Frantsuzova IS. Mathematical models of single population. Global Journal of Pure and Applied Mathematics. 2016 Jan 1;12(4):3609-3619.

Author

Kolpak, Eugeny Petrovich ; Stolbovaia, Mariia Vladimirovna ; Frantsuzova, Inna Sergeevna. / Mathematical models of single population. In: Global Journal of Pure and Applied Mathematics. 2016 ; Vol. 12, No. 4. pp. 3609-3619.

BibTeX

@article{42a5a72fab164353825d6e5f7eb06939,

title = "Mathematical models of single population",

abstract = "The paper presents a mathematical model for a single population on a line represented as boundary value problem for a nonlinear differential equation in partial derivatives. The steady equation is solved by quadratures. The paper suggests an algorithm offering a numerical solution to the nonlinear boundary linear problem. It outlines the results of a study on how various parameters affect the behavior of solutions.",

keywords = "Boundary value problem, Mathematical modeling, Population",

author = "Kolpak, {Eugeny Petrovich} and Stolbovaia, {Mariia Vladimirovna} and Frantsuzova, {Inna Sergeevna}",

year = "2016",

month = jan,

day = "1",

language = "English",

volume = "12",

pages = "3609--3619",

journal = "Global Journal of Pure and Applied Mathematics",

issn = "0973-1768",

publisher = "Research India Publications",

number = "4",

}

RIS

TY - JOUR

T1 - Mathematical models of single population

AU - Kolpak, Eugeny Petrovich

AU - Stolbovaia, Mariia Vladimirovna

AU - Frantsuzova, Inna Sergeevna

PY - 2016/1/1

Y1 - 2016/1/1

N2 - The paper presents a mathematical model for a single population on a line represented as boundary value problem for a nonlinear differential equation in partial derivatives. The steady equation is solved by quadratures. The paper suggests an algorithm offering a numerical solution to the nonlinear boundary linear problem. It outlines the results of a study on how various parameters affect the behavior of solutions.

AB - The paper presents a mathematical model for a single population on a line represented as boundary value problem for a nonlinear differential equation in partial derivatives. The steady equation is solved by quadratures. The paper suggests an algorithm offering a numerical solution to the nonlinear boundary linear problem. It outlines the results of a study on how various parameters affect the behavior of solutions.

KW - Boundary value problem

KW - Mathematical modeling

KW - Population

UR - http://www.scopus.com/inward/record.url?scp=84988583485&partnerID=8YFLogxK

M3 - Article

VL - 12

SP - 3609

EP - 3619

JO - Global Journal of Pure and Applied Mathematics

JF - Global Journal of Pure and Applied Mathematics

SN - 0973-1768

IS - 4

ER -

ID: 7578464