References
- Andreu F, Mazón JM, Rossi JD, et al. The Neumann problem for nonlocal nonlinear diffusion equations. J Evol Equ. 2008;8(1):189–215. doi: 10.1007/s00028-007-0377-9
- Andreu-Vaillo F, Mazón JM, Rossi JD, et al. Nonlocal diffusion problems. Providence (RI)/Madrid: American Mathematical Society/Real Sociedad Matemática Española; 2010 (Mathematical surveys and monographs; vol. 165).
- Berestycki H, Nadin G, Perthame B, et al. The non-local Fisher–KPP equation: travelling waves and steady states. Nonlinearity. 2009;22(12):2813–2844. doi: 10.1088/0951-7715/22/12/002
- Chasseigne E, Chaves M, Rossi JD. Asymptotic behavior for nonlocal diffusion equations. J Math Pures Appl. 2006;86(3):271–291. doi: 10.1016/j.matpur.2006.04.005
- Da Silva SH, Pereira AL. Global attractors for neural fields in a weighted space. Mat Contemp. 2009;36:139–153.
- De Masi A, Gobron T, Presutti E. Travelling fronts in non-local evolution equations. Arch Ration Mech Anal. 1995;132(2):143–205. doi: 10.1007/BF00380506
- De Masi A, Orlandi E, Presutti E, et al. Glauber evolution with Kac potentials. i. Mesoscopic and macroscopic limits, interface dynamics. Nonlinearity. 1994;7(3):633. doi: 10.1088/0951-7715/7/3/001
- Hutson V, Martinez S, Mischaikow K, et al. The evolution of dispersal. J Math Biol. 2003;47(6):483–517. doi: 10.1007/s00285-003-0210-1
- Pereira AL. Global attractor and nonhomogeneous equilibria for a nonlocal evolution equation in an unbounded domain. J Differ Equ. 2006;226(1):352–372. doi: 10.1016/j.jde.2006.03.016
- Valdinoci E. From the long jump random walk to the fractional Laplacian. Bol Soc Esp Mat Apl SeMA. 2009;49:33–44.
- De Masi A, Olivieri E, Presutti E. Critical droplet for a non-local mean field equation. Markov Proc Related Fields. 2000;6:439–472.
- De Masi A, Orlandi E, Presutti E, et al. Stability of the interface in a model of phase separation. Proc R Soc Edinburgh Sec A Math. 1994;124(5):1013–1022. doi: 10.1017/S0308210500022472
- De Masi A, Orlandi E, Presutti E, et al. Uniqueness of the instant on profile and global stability in non-local evolution equations. Rend Mat Delle Appl. 1994;4:693–723.
- Bezerra FD, Pereira AL, Da Silva SH. Existence and continuity of global attractors and nonhomogeneous equilibria for a class of evolution equations with non-local terms. J Math Anal Appl. 2012;396(2):590–600. doi: 10.1016/j.jmaa.2012.06.042
- Da Silva SH, Bezerra FD. Finite fractal dimensionality of attractors for nonlocal evolution equations. Electron J Differ Equ. 2013;2013(221):1–9.
- Chasseigne E, Sastre-Gomez S, et al. A nonlocal two phase Stefan problem. Differ Int Equ. 2013;26(11/12):1335–1360.
- Cortazar C, Elgueta M, Rossi JD. A nonlocal diffusion equation whose solutions develop a free boundary. Ann Henri Poincaré. 2005;6:269–281. doi: 10.1007/s00023-005-0206-z
- Cortazar C, Elgueta M, Rossi JD, et al. How to approximate the heat equation with Neumann boundary conditions by nonlocal diffusion problems. Arch Ration Mech Anal. 2008;187(1):137–156. doi: 10.1007/s00205-007-0062-8
- Rodríguez-Bernal A, Sastre-Gómez S. Nonlinear nonlocal reaction–diffusion equations. In: Casas F, Martínez V, editors. Advances in differential equations and applications. Cham: Springer; 2014. p. 53–61.
- Amari S-i. Dynamics of pattern formation in lateral-inhibition type neural fields. Biol Cybern. 1977;27(2):77–87. doi: 10.1007/BF00337259
- Da Silva SH. Properties of an equation for neural fields in a bounded domain. Electron J Differ Equ. 2012;2012(42):1–9.
- Rodríguez-Bernal A, Sastre-Gómez S. Linear non-local diffusion problems in metric measure spaces. Proc R Soc Edinburgh Sec A Math. 2016;146(4):833–863. doi: 10.1017/S0308210515000724
- Folland GB. Introduction to partial differential equations. Princeton (NJ): Princeton University Press; 1995.
- Ladas GE, Lakshmikantham V. Differential equations in abstract spaces. New York (NY): Elsevier; 1972.
- Daleckii JL, Kren MG. Stability of solutions of differential equations in Banach space. New York (NY): American Mathematical Society; 2002.
- Rall LB. Nonlinear functional analysis and applications: proceedings of an advanced seminar conducted by the Mathematics Research Center, the University of Wisconsin, Madison, October 12–14, 1970. Number 26. Elsevier; 2014.
- Carvalho A, Langa JA, Robinson J. Attractors for infinite-dimensional non-autonomous dynamical systems. New York (NY): Springer Science & Business Media; 2012.