Mathematical modeling of malignant ovarian tumors

IF 0.3 Q4 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Vestnik Sankt-Peterburgskogo Universiteta Seriya 10 Prikladnaya Matematika Informatika Protsessy Upravleniya Pub Date : 2022-01-01 DOI:10.21638/11701/spbu10.2022.110

A. Goncharova, E. Kolpak, Maria Yu. Vil’, Alina Abramova, E. Busko

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引用次数: 0

Abstract

The article explores modeling the development of ovarian cancer, the treatment of this oncologicaldisease in women, the assessment of the time to achieve remission, and the assessment of the time of the onset of relapse. The relevance of the study is that ovarian cancer is one of the most common cancers in women and has the highest mortality rate among all gynecological diseases. Modeling the process of the development of the disease makes it possible to better understand the mechanism of the development of the disease, as well as the time frame of the onset of each stage, as well as the assessment of the survival time. The aim of the work is to develop a model of an ovarian tumor. It is based on a model of competition between two types of cells: epithelial cells (normal cells) and tumor cells (dividing cells). The mathematical interpretation of the competition model is the Cauchy problem for a system of ordinary differential equations. Treatment is seen as the direct destruction of tumor cells by drugs. The behavior of solutions in the vicinity of stationary points is investigated by the eigenvalues of the Jacobi matrix of the right side of the equations. On the basis of this model, the distribution of conditional patients by four stages of the disease is proposed. Biochemical processes that stimulate the accelerated growth of the tumor cell population are modeled by a factor that allows tumor cells to gain an advantage in a competitive relationship with epithelial cells. The spatio-temporal dynamics of an ovarian tumor leads to a modification of the competition model due to the introduction of additional factors into it, taking into account the presence of increased nutrition of ovarian tumors, the exit of the tumor from the plane of the ovary, as well as the effect of treatment on tumor cells. The new model describes the interaction conditions with a system of second-order partial differential equations. The results of computer modeling demonstrate an assessment of the distribution of conditional patients by stages of the disease, the time of onset of relapse, the duration of remission, the obtained theoretical results of modeling are compared with the real data.

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恶性卵巢肿瘤的数学建模

这篇文章探讨了卵巢癌的发展模型，这种肿瘤疾病在女性中的治疗，达到缓解的时间评估，以及复发的开始时间评估。这项研究的相关性在于，卵巢癌是女性最常见的癌症之一，在所有妇科疾病中死亡率最高。对疾病的发展过程进行建模，可以更好地了解疾病的发展机制，以及每个阶段发病的时间框架，以及对生存时间的评估。这项工作的目的是建立一个卵巢肿瘤模型。它基于两种细胞之间的竞争模型:上皮细胞(正常细胞)和肿瘤细胞(分裂细胞)。竞争模型的数学解释是常微分方程组的柯西问题。治疗被认为是用药物直接破坏肿瘤细胞。利用方程右侧雅可比矩阵的特征值，研究了解在平稳点附近的行为。在此模型的基础上，提出了病情患者在疾病的四个阶段的分布。刺激肿瘤细胞群加速生长的生化过程是由一个因子模拟的，该因子允许肿瘤细胞在与上皮细胞的竞争关系中获得优势。由于引入了额外的因素，卵巢肿瘤的时空动态导致了竞争模型的修改，考虑到卵巢肿瘤营养增加的存在，肿瘤从卵巢平面退出，以及治疗对肿瘤细胞的影响。新模型描述了二阶偏微分方程组的相互作用条件。计算机模拟的结果显示了按疾病分期、复发时间、缓解持续时间对有条件患者分布的评估，并将模拟的理论结果与实际数据进行了比较。

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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来源期刊

Vestnik Sankt-Peterburgskogo Universiteta Seriya 10 Prikladnaya Matematika Informatika Protsessy Upravleniya MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-

CiteScore

1.30

自引率

50.00%

发文量

期刊介绍： The journal is the prime outlet for the findings of scientists from the Faculty of applied mathematics and control processes of St. Petersburg State University. It publishes original contributions in all areas of applied mathematics, computer science and control. Vestnik St. Petersburg University: Applied Mathematics. Computer Science. Control Processes features articles that cover the major areas of applied mathematics, computer science and control.