Qualitative analysis of a mathematical model of divorce epidemic with anti-divorce therapy

R. I. Gweryina, F. S. Kaduna, Muhammadu Yahaya Kura
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引用次数: 3

Abstract

Marriage is the living together of two persons as husband and wife. Separation and Divorce are the frontier challenges facing the existence of stable family system. In this paper, we construct an epidemiological model of divorce epidemic using standard incidence function as force of marital disunity. The study examines qualitatively that the two equilibra (divorce-free and endemic equilibrium point) are globally stable by Lyapunov functions. Numerical results reveal that, anti-divorce protocols and reconciliation can jointly stabilize marriages, and Married cases that survive divorce epidemic in 30 years period of marriage (twice the survival period of separation) cannot break again.
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离婚流行与反离婚治疗的数学模型定性分析
婚姻是两个人作为丈夫和妻子共同生活。分居与离婚是稳定家庭制度存在所面临的前沿挑战。本文以标准发生率函数作为婚姻不统一的力,构建了离婚流行病学模型。通过Lyapunov函数定性地检验了两个平衡点(无离婚平衡点和地方性平衡点)的全局稳定性。数值结果表明,反离婚协议和和解可以共同稳定婚姻,在30年(分居生存期的两倍)的婚姻中度过离婚流行病的已婚夫妇不会再次破裂。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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