Showing total 6 results

1. Lyapunov functionals for a general time-delayed virus dynamic model with different CTL responses.

Author

Guo, Ke and Guo, Songbai

Subjects

*CYTOTOXIC T cells, *DYNAMIC models, *BASIC reproduction number, *FUNCTIONALS

Abstract

A time-delayed virus dynamic model is proposed with general monotonic incidence, different nonlinear CTL (cytotoxic T lymphocyte) responses [CTL elimination function p y g 1 (z) and CTL stimulation function c y g 2 (z) ], and immune impairment. Indeed, the different CTL responses pose challenges in obtaining the dissipativeness of the model. By constructing appropriate Lyapunov functionals with some detailed analysis techniques, the global stability results of all equilibria of the model are obtained. By the way, we point out that the partial derivative f v (x , 0) is increasing (but not necessarily strictly) in x > 0 for the general monotonic incidence f (x , v). However, some papers defaulted that the partial derivative was strictly increasing. Our main results show that if the basic reproduction number R 0 ≤ 1 , the infection-free equilibrium E 0 is globally asymptotically stable (GAS); if CTL stimulation function c y g 2 (z) = 0 for z = 0 and the CTL threshold parameter R 1 ≤ 1 < R 0 , then the immunity-inactivated infection equilibrium E 1 is GAS; if the immunity-activated infection equilibrium E + exists, then it is GAS. Two specific examples are provided to illustrate the applicability of the main results. The main results acquired in this paper improve or extend some of the existing results. [ABSTRACT FROM AUTHOR]

Published

2024

2. Chemotaxis-driven stationary and oscillatory patterns in a diffusive HIV-1 model with CTL immune response and general sensitivity.

Author

Han, Renji, Dai, Binxiang, and Chen, Yuming

Subjects

CHEMOTAXIS, CYTOTOXIC T cells, IMMUNE response, HOPFIELD networks, BASIC reproduction number, HIV

Abstract

In this paper, a reaction–diffusion–chemotaxis HIV-1 model with a cytotoxic T lymphocyte (CTL) immune response and general sensitivity is investigated. We first prove the global classical solvability and L ∞ -boundedness for the considered model in a bounded domain with arbitrary spatial dimensions, which extends the previous existing results. Then, we apply the global existence result to the case with a linear proliferation immune response and an incidence rate. We study the spatiotemporal dynamics about the three types of spatially homogeneous steady states: infection-free steady state S 0 , CTL-inactivated infection steady state S 1 , and CTL-activated infection steady state S ∗. Our analyses indicate that S 0 is globally asymptotically stable if the basic reproduction number R 0 is less than 1; if R 0 is between 1 and a threshold, then S 1 is globally asymptotically stable. However, if R 0 is larger than the threshold, then the chemoattraction and chemorepulsion can destabilize S ∗ , and thus, a spatiotemporal pattern forms as the chemotactic sensitivity crosses certain critical values. We obtain two kinds of important patterns, which are induced by chemotaxis: stationary Turing pattern and irregular oscillatory pattern. We also find that different chemotactic response functions can affect system's dynamics. Based on some empirical parameter values, numerical simulations are given to illustrate the effectiveness of the theoretical predications. [ABSTRACT FROM AUTHOR]

Published

2023

3. Interaction and development of breast cancer cells with immune response using first order ODE.

Author

Azizan, Farah Liyana, Sathasivam, Saratha, Ali, Majid Khan Majahar, Zulkifli, Halimatul Najihah, Asmadi, Noorhatini, and Isa, Nur Liyana

Subjects

*BREAST, *CANCER cells, *CYTOTOXIC T cells, *IMMUNE response, *SOMATOTYPES, *BREAST cancer

Abstract

Breast cancer arises when cells develop uncontrollably in the breast to form tumour cells. The risk of having breast cancer rises as a woman continues to age. Thus, details about the early stages of cancer progression can help a woman make early treatment choices, preventing them from being diagnosed with these harmful cancers. It is believed that cytotoxic T lymphocytes (CTLs) act as effector cells to eradicate cancer cells. CTLs and tumor cells were discovered to be around a "predator-prey" relationship, with CTL acting as the predator along with tumor cells acting as the prey. In this paper, we examined steady-state solutions for two numerical differentiation using the Jacobian matrix. We will also examine the stability region of breast cancer cells in two different phases to describe its progress in different types of the human body at various phases. Also, compare tumour cells population development in the duration of interphase and metaphase in the presence and the absence of immune response, which is dependent on the CTL population, will be observed by applying Fourth Order Runge Kutta (RK4) method. We can see that the Runge-Kutta method is an important method for approximate solutions to ordinary systems with known initial conditions. We achieved populations value of tumour cells throughout interphase and mitosis as well as the population of the immune system using the method. Based on our observations, we draw the conclusion that persons with a higher immune system are more likely to be able to fight cancer for for a period of time than cancer sufferers with a poor immune system. We may observe that the cancer cells were reduced in a shorter period of time with a high immune response population compared to other lower CTL values. [ABSTRACT FROM AUTHOR]

Published

2024

4. Modeling the viral dynamics of SARS-CoV-2 infection on tumor-immune system treated by chemotherapy.

Author

Sa'adah, A., Kamil, D. A., and Setyowisnu, G. E.

Subjects

CYTOTOXIC T cells, SARS-CoV-2, CANCER chemotherapy, COVID-19 pandemic, EPITHELIAL cells

Abstract

Cancer is one of the diseases that causes the highest mortality rate in the world, where most used treatment is chemotherapy that destroys both cancer and healthy cells. The side effect of chemotherapy is fatigue caused by a decrease in the body's immune. This situation has become quite risky due to the presence of COVID-19 outbreak in the world, where the virus attacks humans with poor immunity. The aim of this paper is to develop the mathematical model about the viral dynamics of SARS-CoV-2 on tumor-immune system of cancer patient with chemotherapy. In the model, we study the interactions between cancer cells, SARS-CoV-2 virus, epithelial cells, and immune system. From the model, we will analyze the equilibrium point stability. In the end, we simulated the effect of chemotherapy towards SARS-CoV-2 infection on cancer patient and the sensitivity analysis of the chemotherapy drugs doses toward the density of Cytotoxic T Lymphocyte cells. [ABSTRACT FROM AUTHOR]

Published

2022

5. The effect of noise in an HIV infection model with cytotoxic T-lymphocyte impairment.

Author

Majumder, Abhijit, Sardar, Shibani, and Bairagi, Nandadulal

Subjects

HIV infections, CYTOTOXIC T cells, HIV, STOCHASTIC analysis, T cells, CELLULAR recognition

Abstract

The human immunodeficiency virus (HIV) interacts with the immune cells within the human body, where the environment is uncertain and noisy. Stochastic models can successfully encapsulate the effect of such a noisy environment compared to their deterministic counterparts. The human immune system is complex but well-coordinated with various immune cells like C D 4 + T cells, dendritic cells, and cytotoxic T-lymphocyte (CTL) cells, among many others. The CTL can kill the antigenic cells after its recognition. However, the efficacy of CTL in removing the infected C D 4 + T cells is progressively compromised in HIV-infected individuals. This paper considers a noise-induced HIV-immune cell interaction model with immune impairment. A multiplicative white noise is introduced in the infection rate parameter to represent the fluctuations around the average value of the rate parameter as a causative effect of the noise. We analyzed the deterministic and stochastic models and prescribed sufficient conditions for infection eradication and persistence. It is determined under what parametric restrictions the asymptotic solutions of the noise-induced system will be a limiting case of the deterministic solutions. Simulation results revealed that the solutions of the deterministic system either converge to a CTL-dominated interior equilibrium or a CTL-free immunodeficient equilibrium, depending on the initial values of the system. Stochastic analysis divulged that higher noise might be helpful in the infection removal process. The extinction time of infected C D 4 + T cells for some fixed immune impairment gradually decreases with increasing noise intensity and follows the power law. [ABSTRACT FROM AUTHOR]

Published

2022

6. CAR-T cells secreting immune checkpoint antibodies relieve immunosuppression.

Author

Lv, Keyi

Subjects

*IMMUNE checkpoint proteins, *IMMUNOGLOBULINS, *IMMUNOSUPPRESSION, *PROGRAMMED death-ligand 1, *IMMUNOLOGICAL tolerance, *T cells, *PROGRAMMED cell death 1 receptors, *CYTOTOXIC T cells

Abstract

Tumor microenvironment (TME) plays a key role in tumor immune escape. PD-1/PD-L1 signal transduction pathway can achieve tumor immune escape by enhancing tumor cell immune tolerance and inhibiting the activation of T lymphocytes. In recent years, immunosuppression, as one of the many mechanisms of tumor immune escape, has also become a research hotspo. The optimized CAR-T cells released immunosuppression by secreting antibodies against checkpoint inhibitors. Therefore, CAR-T therapy targeting tumor micro environment and PD-1/PD-L1 pathway are important methods for cancer treatment. This paper summarizes the role of PD-1/PD-L1 signaling pathway in mediating tumor escape in tumor microenvironment, and briefly introduces CAR-T immunotherapy and its TME-related targets. [ABSTRACT FROM AUTHOR]

Published

2022