Reductive non-connected groups appear frequently in the study of algebraic groups, for example, as centralizers of semisimple elements in non-simply connected semisimple groups. Let G be a non-connected reductive algebraic group over an algebraically closed field of arbitrary characteristic and let D be a connected component of G. We consider the strata in D defined by Lusztig as fibers of a map E given in terms of truncated induction of Springer representations. By the definition of the map E, one can see that elements with the same unipotent part and the same centralizer of the semisimple part are in the same stratum. The connected component of the set collecting the elements with these properties are called Jordan classes. In his work, Lusztig suggests that the strata are locally closed, and in my work I show this assertion. To prove it, I show that a stratum is a union of the regular part of the closure of Jordan classes. From this result, one can also describe the irreducible components of a stratum in terms of regular closures of Jordan classes.