In this work, we consider the long-time asymptotics of the modified Landau-Lifshitz equation with nonzero boundary conditions (NZBCs) at infinity. The critical technique is the deformations of the corresponding matrix Riemann-Hilbert problem via the nonlinear steepest descent method, as well as we employ the g-function mechanism to eliminate the exponential growths of the jump matrices. The results indicate that the solution of the modified Landau-Lifshitz equation with nonzero boundary conditions admits two different asymptotic behavior corresponding to two types of regions in the xt-plane. They are called the plane wave region with x < (β − 4 √ 2q 0 )t, x > (β + 4 √ 2q 0 )t, and the modulated elliptic wave region with (β − 4 √ 2q 0 )t < x < (β + 4 √ 2q 0 )t, respectively.