Gamma-convergence of multiscale periodic energies depending on the curl of divergence-free -convergence of multiscale periodic energies depending on the curl of divergence-free
2012 - H. P. Serrano
Differential and Difference Equations with Applications Springer Proceedings in Mathematics & Statistics. 47, 579-589 (2012)
Serrano, Hélia Pereira.
We study the Gamma-convergence of a sequence of multiscale periodic quadratic energies, depending on the curl of solenoidal fields, whose associated Euler–Lagrange equations are the vector potential formulation of the stationary Maxwell equations, which may describe the magnetic properties of a multiscale periodic composite material.