There are different approaches that indicate the dynamic of the growth of microbe. In this research, we simulate the growth by utilizing the concept of fractional calculus. We investigate a fractional system of integro-differential equations, which covers the subtleties of the diffusion between infected and asymptomatic cases. The suggested system is applicable to distinguish the presentation of growth level of the infection and to approve if its mechanism is positively active. An optimal solution under simulation mapping assets is considered. The estimated numerical solution is indicated by employing the fractional Tutte polynomials. Our methodology is based on the Atangana–Baleanu calculus (ABC). We assess the recommended system by utilizing real data.

有不同的方法可以指示微生物生长的动态。在这项研究中，我们利用分数阶微积分的概念来模拟增长。我们研究了积分微分方程的分数系统，它涵盖了感染病例和无症状病例之间扩散的微妙之处。建议的系统适用于区分感染的生长水平的表现，并批准其机制是否积极活动。考虑了模拟映射资产下的最佳解决方案。估计的数值解通过使用分数 Tutte 多项式表示。我们的方法基于 Atangana-Baleanu 演算 (ABC)。我们使用真实数据评估推荐系统。