In this paper,the authors discuss the conditions for Orlicz-Bochner function spaces with Luxemburg norm to be noncreasy(NC) and obtain that,if X is a reflexive Banach space, then the Orlicz-Bochner spaces L_(Φ)(X) is NC if and only if L_(Φ)(X) is rotund or L_(Φ)(X) is smooth.

Following[6],in reflexive,smooth,strictly convex Bochner-Orlicz spaces,a representation of the best approximent element is given in this paper by means of the representation of the dual mapping given in [6].

For Orlicz-Bochner sequence spaces with Luxemburg norm,the (criteria) of the strongly extreme points and mid-point locally uniformly rotundity have been given.

By using the generating function M and properties of the Banach space X,the criteria of smoothness for the Orlicz-Bochner sequence spaces endowed with the Luxemburg norm and the Orlicz norm are obtained.

In this paper,by using Orlicz space and Lebesgue-Bochner space theory and skills,we characterize spherical characteristics of Orlicz-Bochner function space with the Luxemburg norm,and the sufficient conditions were given for the locally uniform rotundity point of Orlicz-Bochner function space with the Luxemburg norm.