We study a variational model for ferronematics in two-dimensional domains, in the “super-dilute” regime. The free energy functional consists of a reduced Landau- de Gennes energy for the nematic order parameter, a Ginzburg–Landau type en- ergy for the spontaneous magnetisation, and a coupling term that favours the co- alignment of the nematic director and the magnetisation. In a suitable asymptotic regime, we prove that the nematic order parameter converges to a canonical har- monic map with non-orientable point defects, while the magnetisation converges to a singular vector field, with line defects that connect the non-orientable point defects in pairs, along a minimal connection.
Two-Dimensional Ferronematics, Canonical Harmonic Maps and Minimal Connections / Canevari, Giacomo; Majumdar, Apala; Stroffolini, Bianca; Wang, Yiwei. - In: ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS. - ISSN 0003-9527. - 247:6(2023), pp. 1-61. [10.1007/s00205-023-01937-x]
Two-Dimensional Ferronematics, Canonical Harmonic Maps and Minimal Connections
Stroffolini, Bianca;
2023
Abstract
We study a variational model for ferronematics in two-dimensional domains, in the “super-dilute” regime. The free energy functional consists of a reduced Landau- de Gennes energy for the nematic order parameter, a Ginzburg–Landau type en- ergy for the spontaneous magnetisation, and a coupling term that favours the co- alignment of the nematic director and the magnetisation. In a suitable asymptotic regime, we prove that the nematic order parameter converges to a canonical har- monic map with non-orientable point defects, while the magnetisation converges to a singular vector field, with line defects that connect the non-orientable point defects in pairs, along a minimal connection.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
