On Köthe duals of Orlicz-Lorentz spaces

In this article, we study a number of properties of the Köthe duals $\mathcal{M}_{\varphi,w}$ of Orlicz-Lorentz spaces. An explicit description of the order-continuous subspace of $\mathcal{M}_{\varphi,w}$ is provided. Moreover, the separability of these spaces is characterized by the growth condition $Δ_2$. Consequently, the Köthe dual space $\mathcal{M}_{\varphi,w}$ has the Radon-Nikodým property if and only if the N-function at infinity $\varphi$ satisfies the appropriate $Δ_2$-condition. The comparison between $\mathcal{M}_{\varphi,w}$ spaces is characterized via standard orders between Orlicz functions. As applications of these results, we provide sufficient conditions for M-embedded order-continuous subspaces of Orlicz-Lorentz spaces equipped with the Luxemburg norm and prove the existence of a unique norm-preserving extension on Orlicz-Lorentz spaces equipped with the Orlicz norm.