Experimentally-driven mathematical model to understand the effects of matrix deprivation in breast cancer metastasis.

IF 3.5 2区生物学 Q1 MATHEMATICAL & COMPUTATIONAL BIOLOGY NPJ Systems Biology and Applications Pub Date : 2024-11-12 DOI:10.1038/s41540-024-00443-4

Sayoni Maiti, Annapoorni Rangarajan, Venkatesh Kareenhalli

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Abstract

Normal epithelial cells receive proper signals for growth and survival from attachment to the underlying extracellular matrix (ECM). They perceive detachment from the ECM as a stress and die - a phenomenon termed as 'anoikis'. However, metastatic cancer cells acquire anoikis-resistance and circulate through the blood and lymphatics to seed metastasis. Under normal (adherent) growth conditions, the serine-threonine protein kinase Akt stimulates protein synthesis and cell growth, maintaining an anabolic state in the cancer cell. In contrast, previously we showed that the stress due to matrix deprivation is sensed by yet another serine-threonine kinase, AMP-activated protein kinase (AMPK), that inhibits anabolic pathways while promoting catabolic processes. We illustrated a switch from Akt^high/AMPK^low in adherent condition to AMPK^high/Akt^low in matrix-detached condition, with consequent metabolic switching from an anabolic to a catabolic state, which aids cancer cell stress-survival. In this study, we utilized these experimental data and developed a deterministic ordinary differential equation (ODE)-based mechanistic mathematical model to mimic attachment-detachment signaling network. To do so, we used the framework of insulin-glucagon signaling with consequent metabolic shifts to capture the pathophysiology of matrix-deprived state in breast cancer cells. Using the developed metastatic breast cancer signaling (MBCS) model, we identified perturbation of several signaling proteins such as IRS, PI3K, PKC, GLUT1, IP3, DAG, PKA, cAMP, and PDE3 upon matrix deprivation. Further, in silico molecular perturbations revealed that several feedback/crosstalks like DAG to PKC, PKC to IRS, S6K1 to IRS, cAMP to PKA, and AMPK to Akt are essential for the metabolic switching in matrix-deprived cancer cells. AMPK knockdown simulations identified a crucial role for AMPK in maintaining these adaptive changes. Thus, this mathematical framework provides insights on attachment-detachment signaling with metabolic adaptations that promote cancer metastasis.

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通过实验建立数学模型，了解基质剥夺对乳腺癌转移的影响。

正常的上皮细胞通过附着在下层细胞外基质（ECM）上，接收适当的生长和存活信号。它们将脱离 ECM 视为一种压力并死亡，这种现象被称为 "anoikis"。然而，转移性癌细胞会获得抗粘附性，并通过血液和淋巴管循环，播下转移的种子。在正常（粘附）生长条件下，丝氨酸-苏氨酸蛋白激酶 Akt 会刺激蛋白质合成和细胞生长，维持癌细胞的合成代谢状态。与此相反，我们之前的研究表明，基质匮乏导致的压力会被另一种丝氨酸-苏氨酸激酶--AMP-激活蛋白激酶（AMPK）感知，AMPK 会抑制合成代谢途径，同时促进分解代谢过程。我们展示了从粘附状态下的Akthigh/AMPKlow到基质脱落状态下的AMPKhigh/Aktlow的转换，以及随之而来的从合成代谢状态到分解代谢状态的代谢转换，这有助于癌细胞的应激生存。在本研究中，我们利用这些实验数据，建立了一个基于确定性常微分方程（ODE）的机理数学模型来模拟附着-脱落信号网络。为此，我们使用了胰岛素-胰高血糖素信号转导以及随之而来的新陈代谢转变的框架来捕捉乳腺癌细胞基质匮乏状态的病理生理学。利用开发的转移性乳腺癌信号传导（MBCS）模型，我们发现了基质剥夺时IRS、PI3K、PKC、GLUT1、IP3、DAG、PKA、cAMP和PDE3等信号蛋白的扰动。此外，硅学分子扰动发现，一些反馈/串联蛋白，如DAG到PKC、PKC到IRS、S6K1到IRS、cAMP到PKA和AMPK到Akt，对基质剥夺癌细胞的代谢转换至关重要。AMPK 敲除模拟确定了 AMPK 在维持这些适应性变化中的关键作用。因此，这一数学框架提供了关于附着-脱落信号转导与促进癌症转移的代谢适应的见解。

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来源期刊

NPJ Systems Biology and Applications Mathematics-Applied Mathematics

CiteScore

5.80

自引率

0.00%

发文量

审稿时长

8 weeks

期刊介绍： npj Systems Biology and Applications is an online Open Access journal dedicated to publishing the premier research that takes a systems-oriented approach. The journal aims to provide a forum for the presentation of articles that help define this nascent field, as well as those that apply the advances to wider fields. We encourage studies that integrate, or aid the integration of, data, analyses and insight from molecules to organisms and broader systems. Important areas of interest include not only fundamental biological systems and drug discovery, but also applications to health, medical practice and implementation, big data, biotechnology, food science, human behaviour, broader biological systems and industrial applications of systems biology. We encourage all approaches, including network biology, application of control theory to biological systems, computational modelling and analysis, comprehensive and/or high-content measurements, theoretical, analytical and computational studies of system-level properties of biological systems and computational/software/data platforms enabling such studies.