类风湿关节炎治疗数学模型的求解

L. Matteucci, M. Nucci
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引用次数: 2

摘要

类风湿性关节炎是一种病因不明的自身免疫性疾病,表现为持续性炎症性滑膜炎并最终破坏关节。免疫系统将滑膜细胞识别为非自身细胞,从而引起淋巴细胞和抗体的增殖,这是由促炎细胞因子促进的,最重要的是肿瘤坏死因子TNF-α。在类风湿关节炎的治疗中,单克隆抗体或可溶性受体被用来中和TNF-α的生物活性,如sTNFR2、依那西普和英夫利昔单抗。在[M。Jit等人。风湿病学2005;44:32 23-331]提出了炎症滑膜关节中局部产生的TNF-α可以与细胞表面受体结合的数学模型。它由四个耦合的常微分方程组成,在假设一系列关键参数估计的情况下对它们进行数值积分。在本文中,我们通过确定这些方程在特定条件下的通解来补充以前的工作。然后,我们表征了TNF-α在不同抑制剂存在下的行为,并评估了抑制剂在治疗类风湿性关节炎中的有效性。
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Solution of a mathematical model for the treatment of rheumatoid arthritis
Abstract Rheumatoid arthritis is an autoimmune disease of unknown etiology that manifests as a persistent inflammatory synovitis and eventually destroys the joints. The immune system recognizes synovial cells as not self and consequently causes lymphocyte and antibody proliferation that is promoted by the pro-inflammatory cytokines, the most significant being tumor necrosis factor TNF-α. In the treatment of rheumatoid arthritis either monoclonal antibodies or soluble receptors are used to neutralize the TNF-α bioactivity, such as sTNFR2, Etanercept and Infliximab. In [M. Jit et al. Rheumatology 2005;44:323-331] a mathematical model that represents the TNF-α dynamics in the inflamed synovial joint within which locally produced TNF-α can bind to cell-surface receptors was proposed. It consists of four coupled ordinary differential equations, that were integrated numerically assuming a range of estimates of the key parameters. In this paper we complement the previous work by determining the general solution of those equations for specific conditions on the parameters. Then we characterize the behavior of TNF-α in the presence of different inhibitors and also evaluate the inhibitors effectiveness in the treatment of rheumatoid arthritis.
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来源期刊
CiteScore
1.30
自引率
0.00%
发文量
3
审稿时长
16 weeks
期刊介绍: Communications in Applied and Industrial Mathematics (CAIM) is one of the official journals of the Italian Society for Applied and Industrial Mathematics (SIMAI). Providing immediate open access to original, unpublished high quality contributions, CAIM is devoted to timely report on ongoing original research work, new interdisciplinary subjects, and new developments. The journal focuses on the applications of mathematics to the solution of problems in industry, technology, environment, cultural heritage, and natural sciences, with a special emphasis on new and interesting mathematical ideas relevant to these fields of application . Encouraging novel cross-disciplinary approaches to mathematical research, CAIM aims to provide an ideal platform for scientists who cooperate in different fields including pure and applied mathematics, computer science, engineering, physics, chemistry, biology, medicine and to link scientist with professionals active in industry, research centres, academia or in the public sector. Coverage includes research articles describing new analytical or numerical methods, descriptions of modelling approaches, simulations for more accurate predictions or experimental observations of complex phenomena, verification/validation of numerical and experimental methods; invited or submitted reviews and perspectives concerning mathematical techniques in relation to applications, and and fields in which new problems have arisen for which mathematical models and techniques are not yet available.
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