Your search keyword '"Lombardo, M.C."' showing total 2 results

1. Pattern selection in the 2D FitzHugh–Nagumo model

Author

Marco Sammartino, Gaetana Gambino, Maria Carmela Lombardo, G. Rubino, Gambino G., Lombardo M.C., Rubino G., and Sammartino M.

Subjects

Physics, Turing instability, Applied Mathematics, General Mathematics, Numerical analysis, 010102 general mathematics, Mathematical analysis, Square pattern, 01 natural sciences, Square (algebra), 010305 fluids & plasmas, FitzHugh–Nagumo model, Nonlinear system, Amplitude, Bounded function, 0103 physical sciences, Amplitude equation, Mathematics (all), 0101 mathematics, Eigenvalues and eigenvectors, Bifurcation

Abstract

We construct square and target patterns solutions of the FitzHugh–Nagumo reaction–diffusion system on planar bounded domains. We study the existence and stability of stationary square and super-square patterns by performing a close to equilibrium asymptotic weakly nonlinear expansion: the emergence of these patterns is shown to occur when the bifurcation takes place through a multiplicity-two eigenvalue without resonance. The system is also shown to support the formation of axisymmetric target patterns whose amplitude equation is derived close to the bifurcation threshold. We present several numerical simulations validating the theoretical results.

Published

2018

2. Axisymmetric solutions for a chemotaxis model of Multiple Sclerosis

Author

Francesco Gargano, Maria Carmela Lombardo, Pietro Pantano, Valeria Giunta, Eleonora Bilotta, Marco Sammartino, Bilotta, E., Gargano, F., Giunta, V., Lombardo, M.C., Pantano, P., and Sammartino, M.

Subjects

Physics, Applied Mathematics, General Mathematics, Multiple sclerosis, Numerical analysis, 010102 general mathematics, Mathematical analysis, Rotational symmetry, Chemotaxi, Concentric, medicine.disease, 01 natural sciences, Quantitative Biology::Cell Behavior, 010305 fluids & plasmas, Nonlinear system, Amplitude, Axisymmetric solution, 0103 physical sciences, medicine, Mathematics (all), Multiple sclerosi, 0101 mathematics, Early phase, Bifurcation

Abstract

In this paper we study radially symmetric solutions for our recently proposed reaction–diffusion–chemotaxis model of Multiple Sclerosis. Through a weakly nonlinear expansion we classify the bifurcation at the onset and derive the amplitude equations ruling the formation of concentric demyelinating patterns which reproduce the concentric layers observed in Balò sclerosis and in the early phase of Multiple Sclerosis. We present numerical simulations which illustrate and fit the analytical results.

Published

2018