Abstract
Fractional-order models provide an interdisciplinary approach to multidimensional research domains. The nonlocal characteristic that do not take place in the integer-order differential operators, is the considerable identity of these varieties of model dynamics. The stage of the fractional-order model system not only is conditional upon its present situation but also upon all of its chronological arrangements. Based on these attributes, we have introduced the fractional-order differential equation into our proposed integer-order mathematical model, discussed in the sixth chapter (Part I).
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P.K. Roy, J. Bhadra, B. Chattopadhyay, Mathematical modeling on immunopathogenesis in chronic plaque of psoriasis: a theoritical study, World Congress Engineering, vol. 1, Lecture Notes in Engineering and Computer Science (2010), pp. 550–555
P.K. Roy, A. Datta, A.N. Chatterjee, Saturation effects on immunopathogenic mechanism of psoriasis: a theoretical approach. Acta Anal. Funct. Appl. 13(3), 310–318 (2011)
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Roy, P.K., Datta, A. (2019). Fractional Approach for Incidental Effect of Half-Saturation on the Psoriatic Pathogenesis. In: Mathematical Models for Therapeutic Approaches to Control Psoriasis. SpringerBriefs in Applied Sciences and Technology(). Springer, Singapore. https://doi.org/10.1007/978-981-13-9020-3_9
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DOI: https://doi.org/10.1007/978-981-13-9020-3_9
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