# Designing a Resilient Controller for Cancer Immunotherapy: Application to a Fractional‐Order Tumour‐Immune Model

**Authors:** Mohamadreza Homayounzade, Shayan Sajadian

PMC · DOI: 10.1049/syb2.70019 · IET Systems Biology · 2025-06-05

## TL;DR

This paper introduces a new control method for cancer immunotherapy that effectively eradicates tumors while maintaining immune cell levels.

## Contribution

A novel robust control method using backstepping and deep reinforcement learning for cancer treatment is proposed.

## Key findings

- The proposed control method achieves complete tumor eradication within 50 days.
- The system maintains high levels of effector immune cells during treatment.
- The controller demonstrates robustness against parametric uncertainty.

## Abstract

In this paper, we propose a robust control method for the automatic treatment of targeted anti‐angiogenic molecular therapy based on multi‐input multi‐output (MIMO) nonlinear fractional and non‐fractional models using the backstepping (BS) approach. This protocol aims to eradicate tumour cells while preserving high levels of the body's natural effector cells and maintaining drug dosage within safe limits. The exponential stability of the controlled system is mathematically demonstrated using the Lyapunov theorem. Consequently, the tumour volume's convergence rate can be precisely controlled—a critical factor in cancer treatment. To fine‐tune the controller gains, a soft actor‐critic (SAC) algorithm within the framework of deep reinforcement learning (DRL) is employed, with a reward function designed based on the specific requirements of the system. Additionally, the Lyapunov theorem is used to mathematically verify the system's robustness against parametric uncertainty. Compared to state‐of‐the‐art approaches, the proposed scheme demonstrates superior long‐term performance, achieving complete tumour eradication and drug delivery convergence to zero within 50 days while preserving high effector cell levels.

In this paper, we propose a robust control method for the automatic treatment of targeted anti‐angiogenic molecular therapy based on multi‐input multi‐output (MIMO) nonlinear fractional and non‐fractional models using the backstepping (BS) approach. By applying the Lyapunov theorem, the exponential stability of the controlled system has been mathematically demonstrated. Consequently, the tumour volume's convergence rate can be controlled—a crucial issue in cancer treatment. Moreover, the Lyapunov theorem is employed to mathematically verify the system's robustness against parametric uncertainty. Compared to state‐of‐the‐art approaches, the proposed scheme achieves superior long‐term performance.

## Linked entities

- **Diseases:** cancer (MONDO:0004992)

## Full-text entities

- **Diseases:** Cancer (MESH:D009369)

## Full text

_Full body text omitted from this summary view._ Fetch the complete paper as Markdown: https://tomesphere.com/paper/PMC12140661/full.md

## Figures

14 figures with captions in the complete paper: https://tomesphere.com/paper/PMC12140661/full.md

## References

46 references — full list in the complete paper: https://tomesphere.com/paper/PMC12140661/full.md

---
Source: https://tomesphere.com/paper/PMC12140661