In this paper, a class of reaction-diffusion equations for Multiple Sclerosis is presented. These models are derived by means of a diffusive limit starting from a proper kinetic description, taking account of the underlying microscopic interactions among cells. At the macroscopic level, we discuss the necessary conditions for Turing instability phenomena and the formation of two-dimensional patterns, whose shape and stability are investigated by means of a weakly nonlinear analysis. Some numerical simulations, confirming and extending theoretical results, are proposed for a specific scenario.
Derivation from kinetic theory and 2-D pattern analysis of chemotaxis models for Multiple Sclerosis / Bisi, M.; Groppi, M.; Martalò, G.; Travaglini, R.. - In: JOURNAL OF MATHEMATICAL BIOLOGY. - ISSN 0303-6812. - 91:4(2025), p. 43. [10.1007/s00285-025-02282-1]
Derivation from kinetic theory and 2-D pattern analysis of chemotaxis models for Multiple Sclerosis
Bisi, M.;Groppi, M.;Travaglini, R.
2025-01-01
Abstract
In this paper, a class of reaction-diffusion equations for Multiple Sclerosis is presented. These models are derived by means of a diffusive limit starting from a proper kinetic description, taking account of the underlying microscopic interactions among cells. At the macroscopic level, we discuss the necessary conditions for Turing instability phenomena and the formation of two-dimensional patterns, whose shape and stability are investigated by means of a weakly nonlinear analysis. Some numerical simulations, confirming and extending theoretical results, are proposed for a specific scenario.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
