ORLICZ-LORENTZ SEQUENCE SPACES EQUIPPED WITH THE ORLICZ NORM

In this article, we consider Orlicz-Lorentz sequence spaces equipped with the Orlicz norm (lambda(phi,omega), parallel to . parallel to(O)(phi,omega)) generated by any Orlicz function and any non-increasing weight sequence. As far as we know, research on such a general case is conducted for the first time. After showing that the Orlicz norm is equal to the Amemiya norm in general and giving some important properties of this norm, we study the problem of existence of order isomorphically isometric copies of l(infinity) in the space (lambda(phi,omega), parallel to . parallel to(O)(phi,omega)) and we find criteria for order continuity and monotonicity properties of this space. We also find criteria for monotonicity properties of n-dimensional subspaces lambda(n)(phi,omega) (n >= 2) and the subspace (lambda(phi,omega))(a) of order continuous elements of lambda(phi,omega). Finally, as an immediate consequence of the criteria considered in this article, the properties of Orlicz sequence spaces equipped with the Orlicz norm are deduced.