For an Orlicz function $��$ and a decreasing weight $w$, two intrinsic exact descriptions are presented for the norm in the K��the dual of an Orlicz-Lorentz function space $��_{��,w}$ or a sequence space $��_{��,w}$, equipped with either Luxemburg or Amemiya norms. The first description of the dual norm is given via the modular $\inf\{\int��_*(f^*/|g|)|g|: g\prec w\}$, where $f^*$ is the decreasing rearrangement of $f$, $g\prec w$ denotes the submajorization of $g$ by $w$ and $��_*$ is the complementary function to $��$. The second one is stated in terms of the modular $\int_I ��_*((f^*)^0/w)w$, where $(f^*)^0$ is Halperin's level function of $f^*$ with respect to $w$. That these two descriptions are equivalent results from the identity $\inf\{\int��(f^*/|g|)|g|: g\prec w\}=\int_I ��((f^*)^0/w)w$ valid for any measurable function $f$ and Orlicz function $��$. Analogous identity and dual representations are also presented for sequence spaces.

25 pages