In this paper, we find a conformal vector field as well as a Killing vector field on a compact real submanifold of the canonical complex space form (Cm, J, < , >). In particular, using immersion ϕ:M→Cm  of a compact real submanifold M and the complex structure J of the canonical complex space form (Cm, J, < ,>), we find conditions under which the tangential component of Jϕ  is a conformal vector field as well as conditions under which it is a Killing vector field. Finally, we obtain a characterization of n-spheres in the canonical complex space form (Cm, J, h<,>).