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Dynamics of systems with isotropic competing interactions in an external field: a Langevin approach |
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| Authors: | R. Díaz-Méndez A. Mendoza-Coto R. Mulet L. Nicolao D. A. Stariolo |
| Affiliation: | 1.Nanophysics Group, Department of Physics, Electric Engineering Faculty,CUJAE,La Habana,Cuba;2.“Henri-Poincaré-Group” of Complex Systems, Physics Faculty,University of Havana,La Habana, CP,Cuba;3.Department of Theoretical Physics, Physics Faculty,University of Havana,La Habana, CP,Cuba;4.Dipartimento di Fisica,Università di Roma “La Sapienza”,Roma,Italy;5.Departamento de Física,Universidade Federal do Rio Grande do Sul and National Institute of Science and Technology for Complex Systems,Porto Alegre,Brasil |
| Abstract: | We study the Langevin dynamics of a ferromagnetic Ginzburg-Landau Hamiltonian with a competing long-range repulsive term in the presence of an external magnetic field. The model is analytically solved within the self consistent Hartree approximation for two different initial conditions: disordered or zero field cooled (ZFC), and fully magnetized or field cooled (FC). To test the predictions of the approximation we develop a suitable numerical scheme to ensure the isotropic nature of the interactions. Both the analytical approach and the numerical simulations of two-dimensional finite systems confirm a simple aging scenario at zero temperature and zero field. At zero temperature a critical field h c is found below which the initial conditions are relevant for the long time dynamics of the system. For h < h c a logarithmic growth of modulated domains is found in the numerical simulations but this behavior is not captured by the analytical approach which predicts a t 1/2 growth law at T = 0. |
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